https://michaelnielsen.org/polymath/api.php?action=feedcontributions&feedformat=atom&user=MarioKappaPolymath Wiki - User contributions [en]2026-04-13T12:48:48ZUser contributionsMediaWiki 1.42.3https://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=9609ABC conjecture2015-05-03T19:40:44Z<p>MarioKappa: /* Workshops */ updated link</p>
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<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Bogomolov%20from%20the%20Point%20of%20View%20of%20Inter-universal%20Teichmuller%20Theory.pdf Bogomolov's Proof of the Geometric Version of the Szpiro Conjecture from the Point of View of Inter-universal Teichmuller Theory], Shinichi Mochizuki: "Bogomolov’s proof may be thought of as a sort of useful elementary guide, or blueprint (perhaps even a sort of Rosetta stone!), for understanding substantial portions of inter-universal Teichmüller theory."<br />
<br />
Progress reports:<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202013-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2013)], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202014-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2014)], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10, which were revised in 2013.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
<br />
===Workshops===<br />
* '''9.-20. March 2015''': RIMS Joint Research Workshop: On the verification and further development of inter-universal Teichmuller theory: [http://www.kurims.kyoto-u.ac.jp/~motizuki/2015-03%20IUTeich%20Program%20(English).pdf program]<br />
** Lecture Series by [http://www.kurims.kyoto-u.ac.jp/~gokun/myworks.html Go Yamashita] at Kyushu University ([http://www.math.kyushu-u.ac.jp/seminars/view/1373 announcement in japanese])<br />
** Slides by Yuichiro Hoshi on [http://www.kurims.kyoto-u.ac.jp/~yuichiro/talk20150309.pdf Mono-anabelian Reconstruction of Number Fields]<br />
<br />
* '''7.-11. December 2015''': [https://www.maths.nottingham.ac.uk/personal/ibf/symcor.conf.html Clay Mathematics Institute workshop on the theory of Shinichi Mochizuki], Oxford<br />
<br />
===Survey articles===<br />
*Ivan Fesenko, [https://www.maths.nottingham.ac.uk/personal/ibf/notesoniut.pdf Arithmetic deformation theory via arithmetic fundamental groups and nonarchimedean theta functions, notes on the work of Shinichi Mochizuki]<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
*[http://www.quora.com/Joseph-Heavner/Posts/An-overview-of-Inter-universal-Teichm%C3%BCller-Theory-and-Shinichi-Mochizukis-proof-of-the-ABC-Conjecture-along-with-th An overview of Inter-universal Teichmüller Theory and Shinichi Mochizuki's proof of the ABC Conjecture, along with the current situation and how we can begin to understand this theory], Joseph Heavner, Quora, Aug 18 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=6514 Latest on abc], Not Even Wrong, 19 Dec 2013<br />
*[https://plus.google.com/+RichardElwes/posts/jMVfRcnRaoV Richard Elwes, Google+], 20 Dec 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=7451 Peter Woit on Progress-Report 2014], 13 Jan 2015<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/hK66h2artZc Mochizuki's Frobenioid reconstruction: the final bit] lieven lebruyn Google+, 12 July 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
*[http://www.quora.com/As-of-September-2014-what-is-the-mathematical-communitys-current-understanding-of-Mochizukis-proof-of-the-abc-conjecture As of September 2014, what is the mathematical community's current understanding of Mochizuki's proof of the abc conjecture?] Quora, September 2014.<br />
*[http://mathoverflow.net/questions/195353/what-is-a-frobenioid What is a Frobenioid?], Mathoverflow, 31 January 2015.<br />
*[http://mathoverflow.net/questions/195841/what-is-an-%C3%A9tale-theta-function What is an étale theta function?], Mathoverflow, 07 February 2015.<br />
<br />
<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, 10 May 2013.<br />
*[http://www.newscientist.com/article/dn26753-mathematicians-anger-over-his-unread-500page-proof.html Mathematician's anger over his unread 500-page proof], Jacob Aron, 02 Jan 2015.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=9588ABC conjecture2015-04-14T16:30:47Z<p>MarioKappa: /* Papers */ rosetta stone</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Bogomolov%20from%20the%20Point%20of%20View%20of%20Inter-universal%20Teichmuller%20Theory.pdf Bogomolov's Proof of the Geometric Version of the Szpiro Conjecture from the Point of View of Inter-universal Teichmuller Theory], Shinichi Mochizuki: "Bogomolov’s proof may be thought of as a sort of useful elementary guide, or blueprint (perhaps even a sort of Rosetta stone!), for understanding substantial portions of inter-universal Teichmüller theory."<br />
<br />
Progress reports:<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202013-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2013)], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202014-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2014)], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10, which were revised in 2013.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
<br />
===Workshops===<br />
* '''9.-20. March 2015''': RIMS Joint Research Workshop: On the verification and further development of inter-universal Teichmuller theory: [http://www.kurims.kyoto-u.ac.jp/~motizuki/2015-03%20IUTeich%20Program%20(English).pdf program]<br />
** Lecture Series by [http://www.kurims.kyoto-u.ac.jp/~gokun/myworks.html Go Yamashita] at Kyushu University ([http://www.math.kyushu-u.ac.jp/seminars/view/1373 announcement in japanese])<br />
** Slides by Yuichiro Hoshi on [http://www.kurims.kyoto-u.ac.jp/~yuichiro/talk20150309.pdf Mono-anabelian Reconstruction of Number Fields]<br />
<br />
* '''7.-11. December 2015''': [https://www.maths.nottingham.ac.uk/personal/ibf/conf.html Clay Mathematics Institute workshop on the theory of Shinichi Mochizuki], Oxford<br />
<br />
===Survey articles===<br />
*Ivan Fesenko, [https://www.maths.nottingham.ac.uk/personal/ibf/notesoniut.pdf Arithmetic deformation theory via arithmetic fundamental groups and nonarchimedean theta functions, notes on the work of Shinichi Mochizuki]<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
*[http://www.quora.com/Joseph-Heavner/Posts/An-overview-of-Inter-universal-Teichm%C3%BCller-Theory-and-Shinichi-Mochizukis-proof-of-the-ABC-Conjecture-along-with-th An overview of Inter-universal Teichmüller Theory and Shinichi Mochizuki's proof of the ABC Conjecture, along with the current situation and how we can begin to understand this theory], Joseph Heavner, Quora, Aug 18 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=6514 Latest on abc], Not Even Wrong, 19 Dec 2013<br />
*[https://plus.google.com/+RichardElwes/posts/jMVfRcnRaoV Richard Elwes, Google+], 20 Dec 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=7451 Peter Woit on Progress-Report 2014], 13 Jan 2015<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/hK66h2artZc Mochizuki's Frobenioid reconstruction: the final bit] lieven lebruyn Google+, 12 July 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
*[http://www.quora.com/As-of-September-2014-what-is-the-mathematical-communitys-current-understanding-of-Mochizukis-proof-of-the-abc-conjecture As of September 2014, what is the mathematical community's current understanding of Mochizuki's proof of the abc conjecture?] Quora, September 2014.<br />
*[http://mathoverflow.net/questions/195353/what-is-a-frobenioid What is a Frobenioid?], Mathoverflow, 31 January 2015.<br />
*[http://mathoverflow.net/questions/195841/what-is-an-%C3%A9tale-theta-function What is an étale theta function?], Mathoverflow, 07 February 2015.<br />
<br />
<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, 10 May 2013.<br />
*[http://www.newscientist.com/article/dn26753-mathematicians-anger-over-his-unread-500page-proof.html Mathematician's anger over his unread 500-page proof], Jacob Aron, 02 Jan 2015.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=9586ABC conjecture2015-03-26T13:58:17Z<p>MarioKappa: </p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
Progress reports:<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202013-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2013)], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202014-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2014)], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10, which were revised in 2013.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
<br />
===Workshops===<br />
* '''9.-20. March 2015''': RIMS Joint Research Workshop: On the verification and further development of inter-universal Teichmuller theory: [http://www.kurims.kyoto-u.ac.jp/~motizuki/2015-03%20IUTeich%20Program%20(English).pdf program]<br />
** Lecture Series by [http://www.kurims.kyoto-u.ac.jp/~gokun/myworks.html Go Yamashita] at Kyushu University ([http://www.math.kyushu-u.ac.jp/seminars/view/1373 announcement in japanese])<br />
** Slides by Yuichiro Hoshi on [http://www.kurims.kyoto-u.ac.jp/~yuichiro/talk20150309.pdf Mono-anabelian Reconstruction of Number Fields]<br />
<br />
* '''7.-11. December 2015''': [https://www.maths.nottingham.ac.uk/personal/ibf/conf.html Clay Mathematics Institute workshop on the theory of Shinichi Mochizuki], Oxford<br />
<br />
===Survey articles===<br />
*Ivan Fesenko, [https://www.maths.nottingham.ac.uk/personal/ibf/notesoniut.pdf Arithmetic deformation theory via arithmetic fundamental groups and nonarchimedean theta functions, notes on the work of Shinichi Mochizuki]<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
*[http://www.quora.com/Joseph-Heavner/Posts/An-overview-of-Inter-universal-Teichm%C3%BCller-Theory-and-Shinichi-Mochizukis-proof-of-the-ABC-Conjecture-along-with-th An overview of Inter-universal Teichmüller Theory and Shinichi Mochizuki's proof of the ABC Conjecture, along with the current situation and how we can begin to understand this theory], Joseph Heavner, Quora, Aug 18 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=6514 Latest on abc], Not Even Wrong, 19 Dec 2013<br />
*[https://plus.google.com/+RichardElwes/posts/jMVfRcnRaoV Richard Elwes, Google+], 20 Dec 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=7451 Peter Woit on Progress-Report 2014], 13 Jan 2015<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/hK66h2artZc Mochizuki's Frobenioid reconstruction: the final bit] lieven lebruyn Google+, 12 July 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
*[http://www.quora.com/As-of-September-2014-what-is-the-mathematical-communitys-current-understanding-of-Mochizukis-proof-of-the-abc-conjecture As of September 2014, what is the mathematical community's current understanding of Mochizuki's proof of the abc conjecture?] Quora, September 2014.<br />
*[http://mathoverflow.net/questions/195353/what-is-a-frobenioid What is a Frobenioid?], Mathoverflow, 31 January 2015.<br />
*[http://mathoverflow.net/questions/195841/what-is-an-%C3%A9tale-theta-function What is an étale theta function?], Mathoverflow, 07 February 2015.<br />
<br />
<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, 10 May 2013.<br />
*[http://www.newscientist.com/article/dn26753-mathematicians-anger-over-his-unread-500page-proof.html Mathematician's anger over his unread 500-page proof], Jacob Aron, 02 Jan 2015.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=9582ABC conjecture2015-02-22T11:22:15Z<p>MarioKappa: /* Specific topics */ revised</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
Progress reports:<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202013-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2013)], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202014-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2014)], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10, which were revised in 2013.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
<br />
===Lectures===<br />
* announced Lecture Series by [http://www.kurims.kyoto-u.ac.jp/~gokun/myworks.html Go Yamashita] at Kyushu University ([http://www.math.kyushu-u.ac.jp/seminars/view/1373 announcement in japanese]), three weeks (86,5 hours in total): <br />
** 16.-19.09.2014 (18,5h)<br />
** 09.-13.03.2015 (33,5h)<br />
** 16.-20.03.2015 (35h)<br />
<br />
The lectures in March will be part of a two-weeks workshop at RIMS: [http://www.kurims.kyoto-u.ac.jp/~motizuki/2015-03%20IUTeich%20Program%20(English).pdf program]<br />
* Slides by Yuichiro Hoshi on [http://www.kurims.kyoto-u.ac.jp/~yuichiro/talk20150309.pdf Mono-anabelian Reconstruction of Number Fields]<br />
<br />
===Survey articles===<br />
*Ivan Fesenko, [https://www.maths.nottingham.ac.uk/personal/ibf/notesoniut.pdf Arithmetic deformation theory via arithmetic fundamental groups and nonarchimedean theta functions, notes on the work of Shinichi Mochizuki]<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
*[http://www.quora.com/Joseph-Heavner/Posts/An-overview-of-Inter-universal-Teichm%C3%BCller-Theory-and-Shinichi-Mochizukis-proof-of-the-ABC-Conjecture-along-with-th An overview of Inter-universal Teichmüller Theory and Shinichi Mochizuki's proof of the ABC Conjecture, along with the current situation and how we can begin to understand this theory], Joseph Heavner, Quora, Aug 18 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=6514 Latest on abc], Not Even Wrong, 19 Dec 2013<br />
*[https://plus.google.com/+RichardElwes/posts/jMVfRcnRaoV Richard Elwes, Google+], 20 Dec 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=7451 Peter Woit on Progress-Report 2014], 13 Jan 2015<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/hK66h2artZc Mochizuki's Frobenioid reconstruction: the final bit] lieven lebruyn Google+, 12 July 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
*[http://www.quora.com/As-of-September-2014-what-is-the-mathematical-communitys-current-understanding-of-Mochizukis-proof-of-the-abc-conjecture As of September 2014, what is the mathematical community's current understanding of Mochizuki's proof of the abc conjecture?] Quora, September 2014.<br />
*[http://mathoverflow.net/questions/195353/what-is-a-frobenioid What is a Frobenioid?], Mathoverflow, 31 January 2015.<br />
*[http://mathoverflow.net/questions/195841/what-is-an-%C3%A9tale-theta-function What is an étale theta function?], Mathoverflow, 07 February 2015.<br />
<br />
<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, 10 May 2013.<br />
*[http://www.newscientist.com/article/dn26753-mathematicians-anger-over-his-unread-500page-proof.html Mathematician's anger over his unread 500-page proof], Jacob Aron, 02 Jan 2015.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=9581ABC conjecture2015-02-22T11:20:32Z<p>MarioKappa: /* Lectures */ slides by hoshi for talk at workshop</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
Progress reports:<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202013-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2013)], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202014-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2014)], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
===Lectures===<br />
* announced Lecture Series by [http://www.kurims.kyoto-u.ac.jp/~gokun/myworks.html Go Yamashita] at Kyushu University ([http://www.math.kyushu-u.ac.jp/seminars/view/1373 announcement in japanese]), three weeks (86,5 hours in total): <br />
** 16.-19.09.2014 (18,5h)<br />
** 09.-13.03.2015 (33,5h)<br />
** 16.-20.03.2015 (35h)<br />
<br />
The lectures in March will be part of a two-weeks workshop at RIMS: [http://www.kurims.kyoto-u.ac.jp/~motizuki/2015-03%20IUTeich%20Program%20(English).pdf program]<br />
* Slides by Yuichiro Hoshi on [http://www.kurims.kyoto-u.ac.jp/~yuichiro/talk20150309.pdf Mono-anabelian Reconstruction of Number Fields]<br />
<br />
===Survey articles===<br />
*Ivan Fesenko, [https://www.maths.nottingham.ac.uk/personal/ibf/notesoniut.pdf Arithmetic deformation theory via arithmetic fundamental groups and nonarchimedean theta functions, notes on the work of Shinichi Mochizuki]<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
*[http://www.quora.com/Joseph-Heavner/Posts/An-overview-of-Inter-universal-Teichm%C3%BCller-Theory-and-Shinichi-Mochizukis-proof-of-the-ABC-Conjecture-along-with-th An overview of Inter-universal Teichmüller Theory and Shinichi Mochizuki's proof of the ABC Conjecture, along with the current situation and how we can begin to understand this theory], Joseph Heavner, Quora, Aug 18 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=6514 Latest on abc], Not Even Wrong, 19 Dec 2013<br />
*[https://plus.google.com/+RichardElwes/posts/jMVfRcnRaoV Richard Elwes, Google+], 20 Dec 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=7451 Peter Woit on Progress-Report 2014], 13 Jan 2015<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/hK66h2artZc Mochizuki's Frobenioid reconstruction: the final bit] lieven lebruyn Google+, 12 July 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
*[http://www.quora.com/As-of-September-2014-what-is-the-mathematical-communitys-current-understanding-of-Mochizukis-proof-of-the-abc-conjecture As of September 2014, what is the mathematical community's current understanding of Mochizuki's proof of the abc conjecture?] Quora, September 2014.<br />
*[http://mathoverflow.net/questions/195353/what-is-a-frobenioid What is a Frobenioid?], Mathoverflow, 31 January 2015.<br />
*[http://mathoverflow.net/questions/195841/what-is-an-%C3%A9tale-theta-function What is an étale theta function?], Mathoverflow, 07 February 2015.<br />
<br />
<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, 10 May 2013.<br />
*[http://www.newscientist.com/article/dn26753-mathematicians-anger-over-his-unread-500page-proof.html Mathematician's anger over his unread 500-page proof], Jacob Aron, 02 Jan 2015.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=9577ABC conjecture2015-02-14T11:08:32Z<p>MarioKappa: /* News Media */</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
Progress reports:<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202013-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2013)], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202014-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2014)], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
===Lectures===<br />
* announced Lecture Series by [http://www.kurims.kyoto-u.ac.jp/~gokun/myworks.html Go Yamashita] at Kyushu University ([http://www.math.kyushu-u.ac.jp/seminars/view/1373 announcement in japanese]), three weeks (86,5 hours in total): <br />
** 16.-19.09.2014 (18,5h)<br />
** 09.-13.03.2015 (33,5h)<br />
** 16.-20.03.2015 (35h)<br />
<br />
The lectures in March will be part of a two-weeks workshop at RIMS: [http://www.kurims.kyoto-u.ac.jp/~motizuki/2015-03%20IUTeich%20Program%20(English).pdf program]<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
*[http://www.quora.com/Joseph-Heavner/Posts/An-overview-of-Inter-universal-Teichm%C3%BCller-Theory-and-Shinichi-Mochizukis-proof-of-the-ABC-Conjecture-along-with-th An overview of Inter-universal Teichmüller Theory and Shinichi Mochizuki's proof of the ABC Conjecture, along with the current situation and how we can begin to understand this theory], Joseph Heavner, Quora, Aug 18 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=6514 Latest on abc], Not Even Wrong, 19 Dec 2013<br />
*[https://plus.google.com/+RichardElwes/posts/jMVfRcnRaoV Richard Elwes, Google+], 20 Dec 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=7451 Peter Woit on Progress-Report 2014], 13 Jan 2015<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/hK66h2artZc Mochizuki's Frobenioid reconstruction: the final bit] lieven lebruyn Google+, 12 July 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
*[http://www.quora.com/As-of-September-2014-what-is-the-mathematical-communitys-current-understanding-of-Mochizukis-proof-of-the-abc-conjecture As of September 2014, what is the mathematical community's current understanding of Mochizuki's proof of the abc conjecture?] Quora, September 2014.<br />
*[http://mathoverflow.net/questions/195353/what-is-a-frobenioid What is a Frobenioid?], Mathoverflow, 31 January 2015.<br />
*[http://mathoverflow.net/questions/195841/what-is-an-%C3%A9tale-theta-function What is an étale theta function?], Mathoverflow, 07 February 2015.<br />
<br />
<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, 10 May 2013.<br />
*[http://www.newscientist.com/article/dn26753-mathematicians-anger-over-his-unread-500page-proof.html Mathematician's anger over his unread 500-page proof], Jacob Aron, 02 Jan 2015.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=9576ABC conjecture2015-02-14T11:05:36Z<p>MarioKappa: /* Blogs */ added woits blog-entry</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
Progress reports:<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202013-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2013)], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202014-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2014)], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
===Lectures===<br />
* announced Lecture Series by [http://www.kurims.kyoto-u.ac.jp/~gokun/myworks.html Go Yamashita] at Kyushu University ([http://www.math.kyushu-u.ac.jp/seminars/view/1373 announcement in japanese]), three weeks (86,5 hours in total): <br />
** 16.-19.09.2014 (18,5h)<br />
** 09.-13.03.2015 (33,5h)<br />
** 16.-20.03.2015 (35h)<br />
<br />
The lectures in March will be part of a two-weeks workshop at RIMS: [http://www.kurims.kyoto-u.ac.jp/~motizuki/2015-03%20IUTeich%20Program%20(English).pdf program]<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
*[http://www.quora.com/Joseph-Heavner/Posts/An-overview-of-Inter-universal-Teichm%C3%BCller-Theory-and-Shinichi-Mochizukis-proof-of-the-ABC-Conjecture-along-with-th An overview of Inter-universal Teichmüller Theory and Shinichi Mochizuki's proof of the ABC Conjecture, along with the current situation and how we can begin to understand this theory], Joseph Heavner, Quora, Aug 18 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=6514 Latest on abc], Not Even Wrong, 19 Dec 2013<br />
*[https://plus.google.com/+RichardElwes/posts/jMVfRcnRaoV Richard Elwes, Google+], 20 Dec 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=7451 Peter Woit on Progress-Report 2014], 13 Jan 2015<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/hK66h2artZc Mochizuki's Frobenioid reconstruction: the final bit] lieven lebruyn Google+, 12 July 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
*[http://www.quora.com/As-of-September-2014-what-is-the-mathematical-communitys-current-understanding-of-Mochizukis-proof-of-the-abc-conjecture As of September 2014, what is the mathematical community's current understanding of Mochizuki's proof of the abc conjecture?] Quora, September 2014.<br />
*[http://mathoverflow.net/questions/195353/what-is-a-frobenioid What is a Frobenioid?], Mathoverflow, 31 January 2015.<br />
*[http://mathoverflow.net/questions/195841/what-is-an-%C3%A9tale-theta-function What is an étale theta function?], Mathoverflow, 07 February 2015.<br />
<br />
<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, May 10, 2013.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=9575ABC conjecture2015-02-09T01:17:02Z<p>MarioKappa: /* Q & A */ added new mathoverflow questions</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
Progress reports:<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202013-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2013)], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202014-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2014)], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
===Lectures===<br />
* announced Lecture Series by [http://www.kurims.kyoto-u.ac.jp/~gokun/myworks.html Go Yamashita] at Kyushu University ([http://www.math.kyushu-u.ac.jp/seminars/view/1373 announcement in japanese]), three weeks (86,5 hours in total): <br />
** 16.-19.09.2014 (18,5h)<br />
** 09.-13.03.2015 (33,5h)<br />
** 16.-20.03.2015 (35h)<br />
<br />
The lectures in March will be part of a two-weeks workshop at RIMS: [http://www.kurims.kyoto-u.ac.jp/~motizuki/2015-03%20IUTeich%20Program%20(English).pdf program]<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
*[http://www.quora.com/Joseph-Heavner/Posts/An-overview-of-Inter-universal-Teichm%C3%BCller-Theory-and-Shinichi-Mochizukis-proof-of-the-ABC-Conjecture-along-with-th An overview of Inter-universal Teichmüller Theory and Shinichi Mochizuki's proof of the ABC Conjecture, along with the current situation and how we can begin to understand this theory], Joseph Heavner, Quora, Aug 18 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=6514 Latest on abc], Not Even Wrong, 19 Dec 2013<br />
*[https://plus.google.com/+RichardElwes/posts/jMVfRcnRaoV Richard Elwes, Google+], 20 Dec 2013<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/hK66h2artZc Mochizuki's Frobenioid reconstruction: the final bit] lieven lebruyn Google+, 12 July 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
*[http://www.quora.com/As-of-September-2014-what-is-the-mathematical-communitys-current-understanding-of-Mochizukis-proof-of-the-abc-conjecture As of September 2014, what is the mathematical community's current understanding of Mochizuki's proof of the abc conjecture?] Quora, September 2014.<br />
*[http://mathoverflow.net/questions/195353/what-is-a-frobenioid What is a Frobenioid?], Mathoverflow, 31 January 2015.<br />
*[http://mathoverflow.net/questions/195841/what-is-an-%C3%A9tale-theta-function What is an étale theta function?], Mathoverflow, 07 February 2015.<br />
<br />
<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, May 10, 2013.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=9570ABC conjecture2014-12-25T19:44:36Z<p>MarioKappa: /* Papers */ new verification report on mochizuki's IUTT as of 2014</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
Progress reports:<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202013-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2013)], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202014-12.pdf On the Verification of Inter-Universal Teichmüller theory: A process report (as of december 2014)], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
===Lectures===<br />
* announced Lecture Series by [http://www.kurims.kyoto-u.ac.jp/~gokun/myworks.html Go Yamashita] at Kyushu University ([http://www.math.kyushu-u.ac.jp/seminars/view/1373 announcement in japanese]), three weeks (86,5 hours in total): <br />
** 16.-19.09.2014 (18,5h)<br />
** 09.-13.03.2015 (33,5h)<br />
** 16.-20.03.2015 (35h)<br />
<br />
The lectures in March will be part of a two-weeks workshop at RIMS: [http://www.kurims.kyoto-u.ac.jp/~motizuki/2015-03%20IUTeich%20Program%20(English).pdf program]<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
*[http://www.quora.com/Joseph-Heavner/Posts/An-overview-of-Inter-universal-Teichm%C3%BCller-Theory-and-Shinichi-Mochizukis-proof-of-the-ABC-Conjecture-along-with-th An overview of Inter-universal Teichmüller Theory and Shinichi Mochizuki's proof of the ABC Conjecture, along with the current situation and how we can begin to understand this theory], Joseph Heavner, Quora, Aug 18 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=6514 Latest on abc], Not Even Wrong, 19 Dec 2013<br />
*[https://plus.google.com/+RichardElwes/posts/jMVfRcnRaoV Richard Elwes, Google+], 20 Dec 2013<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/hK66h2artZc Mochizuki's Frobenioid reconstruction: the final bit] lieven lebruyn Google+, 12 July 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
*[http://www.quora.com/As-of-September-2014-what-is-the-mathematical-communitys-current-understanding-of-Mochizukis-proof-of-the-abc-conjecture As of September 2014, what is the mathematical community's current understanding of Mochizuki's proof of the abc conjecture?] Quora, September 2014.<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, May 10, 2013.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=9568ABC conjecture2014-11-23T14:06:31Z<p>MarioKappa: /* Lectures */</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
Progress reports:<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202013-12.pdf ON THE VERIFICATION OF INTER-UNIVERSAL TEICHM¨ULLER THEORY: A PROGRESS REPORT (AS OF DECEMBER 2013)], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
===Lectures===<br />
* announced Lecture Series by [http://www.kurims.kyoto-u.ac.jp/~gokun/myworks.html Go Yamashita] at Kyushu University ([http://www.math.kyushu-u.ac.jp/seminars/view/1373 announcement in japanese]), three weeks (86,5 hours in total): <br />
** 16.-19.09.2014 (18,5h)<br />
** 09.-13.03.2015 (33,5h)<br />
** 16.-20.03.2015 (35h)<br />
<br />
The lectures in March will be part of a two-weeks workshop at RIMS: [http://www.kurims.kyoto-u.ac.jp/~motizuki/2015-03%20IUTeich%20Program%20(English).pdf program]<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
*[http://www.quora.com/Joseph-Heavner/Posts/An-overview-of-Inter-universal-Teichm%C3%BCller-Theory-and-Shinichi-Mochizukis-proof-of-the-ABC-Conjecture-along-with-th An overview of Inter-universal Teichmüller Theory and Shinichi Mochizuki's proof of the ABC Conjecture, along with the current situation and how we can begin to understand this theory], Joseph Heavner, Quora, Aug 18 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=6514 Latest on abc], Not Even Wrong, 19 Dec 2013<br />
*[https://plus.google.com/+RichardElwes/posts/jMVfRcnRaoV Richard Elwes, Google+], 20 Dec 2013<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/hK66h2artZc Mochizuki's Frobenioid reconstruction: the final bit] lieven lebruyn Google+, 12 July 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
*[http://www.quora.com/As-of-September-2014-what-is-the-mathematical-communitys-current-understanding-of-Mochizukis-proof-of-the-abc-conjecture As of September 2014, what is the mathematical community's current understanding of Mochizuki's proof of the abc conjecture?] Quora, September 2014.<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, May 10, 2013.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=9558ABC conjecture2014-10-23T21:40:14Z<p>MarioKappa: /* Lectures */</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
Progress reports:<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202013-12.pdf ON THE VERIFICATION OF INTER-UNIVERSAL TEICHM¨ULLER THEORY: A PROGRESS REPORT (AS OF DECEMBER 2013)], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
===Lectures===<br />
* announced Lecture Series by [http://www.kurims.kyoto-u.ac.jp/~gokun/myworks.html Go Yamashita] at Kyushu University ([http://www.math.kyushu-u.ac.jp/seminars/view/1373 announcement in japanese]), three weeks (86,5 hours in total): <br />
** 16.-19.09.2014 (18,5h)<br />
** 09.-13.03.2015 (33,5h)<br />
** 16.-20.03.2015 (35h)<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
*[http://www.quora.com/Joseph-Heavner/Posts/An-overview-of-Inter-universal-Teichm%C3%BCller-Theory-and-Shinichi-Mochizukis-proof-of-the-ABC-Conjecture-along-with-th An overview of Inter-universal Teichmüller Theory and Shinichi Mochizuki's proof of the ABC Conjecture, along with the current situation and how we can begin to understand this theory], Joseph Heavner, Quora, Aug 18 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=6514 Latest on abc], Not Even Wrong, 19 Dec 2013<br />
*[https://plus.google.com/+RichardElwes/posts/jMVfRcnRaoV Richard Elwes, Google+], 20 Dec 2013<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/hK66h2artZc Mochizuki's Frobenioid reconstruction: the final bit] lieven lebruyn Google+, 12 July 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
*[http://www.quora.com/As-of-September-2014-what-is-the-mathematical-communitys-current-understanding-of-Mochizukis-proof-of-the-abc-conjecture As of September 2014, what is the mathematical community's current understanding of Mochizuki's proof of the abc conjecture?] Quora, September 2014.<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, May 10, 2013.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=9556ABC conjecture2014-10-03T21:40:46Z<p>MarioKappa: /* Q & A */</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
Progress reports:<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202013-12.pdf ON THE VERIFICATION OF INTER-UNIVERSAL TEICHM¨ULLER THEORY: A PROGRESS REPORT (AS OF DECEMBER 2013)], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
===Lectures===<br />
* announced Lecture Series by [http://www.kurims.kyoto-u.ac.jp/~gokun/myworks.html Go Yamashita] in September 2014 at Kyushu University ([http://www.math.kyushu-u.ac.jp/seminars/view/1373 announcement in japanese]), three weeks, all together 63hours.<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
*[http://www.quora.com/Joseph-Heavner/Posts/An-overview-of-Inter-universal-Teichm%C3%BCller-Theory-and-Shinichi-Mochizukis-proof-of-the-ABC-Conjecture-along-with-th An overview of Inter-universal Teichmüller Theory and Shinichi Mochizuki's proof of the ABC Conjecture, along with the current situation and how we can begin to understand this theory], Joseph Heavner, Quora, Aug 18 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=6514 Latest on abc], Not Even Wrong, 19 Dec 2013<br />
*[https://plus.google.com/+RichardElwes/posts/jMVfRcnRaoV Richard Elwes, Google+], 20 Dec 2013<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/hK66h2artZc Mochizuki's Frobenioid reconstruction: the final bit] lieven lebruyn Google+, 12 July 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
*[http://www.quora.com/As-of-September-2014-what-is-the-mathematical-communitys-current-understanding-of-Mochizukis-proof-of-the-abc-conjecture As of September 2014, what is the mathematical community's current understanding of Mochizuki's proof of the abc conjecture?] Quora, September 2014.<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, May 10, 2013.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=User_talk:MarioKappa&diff=9549User talk:MarioKappa2014-08-15T18:14:34Z<p>MarioKappa: </p>
<hr />
<div>Hello MarioKappa,<br />
<br />
I'm writing an expository article on abc triples and the abc conjecture. I want to cite PolyMath's abc conjecture page in my article, because of all the great links to Mochizuki's work and the efforts to understand it; and hence I'll be citing you as one of its authors. Would you be willing to tell me your name? (If not, I'll simply cite "MarioKappa".)<br />
<br />
There must be a way for you to send me email through my PolyMath account (not sure - I'm new here), but if not, feel free to contact me on my user talk page.<br />
<br />
Thank you,<br />
Greg Martin<br />
<br />
::Hello Greg! Thanks for asking. However, I think it's not important what my name is - i'm just excited about this history (mochizuki's claimed proof), and wanted to have a complete list, therefore I added all interesting information I found here.<br />
:: Obviously, i'm looking forward to you article, please inform me, or even better - list it directly at the ABC main page :) -- [[User:MarioKappa|MarioKappa]] 18:14, 15 August 2014 (UTC)</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=9538ABC conjecture2014-07-06T20:25:53Z<p>MarioKappa: /* Blogs */ lecture series by yamashita</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
Progress reports:<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/IUTeich%20Verification%20Report%202013-12.pdf ON THE VERIFICATION OF INTER-UNIVERSAL TEICHM¨ULLER THEORY: A PROGRESS REPORT (AS OF DECEMBER 2013)], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
===Lectures===<br />
* announced Lecture Series by [http://www.kurims.kyoto-u.ac.jp/~gokun/myworks.html Go Yamashita] in September 2014 at Kyushu University ([http://www.math.kyushu-u.ac.jp/seminars/view/1373 announcement in japanese]), three weeks, all together 63hours.<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
*[http://www.quora.com/Joseph-Heavner/Posts/An-overview-of-Inter-universal-Teichm%C3%BCller-Theory-and-Shinichi-Mochizukis-proof-of-the-ABC-Conjecture-along-with-th An overview of Inter-universal Teichmüller Theory and Shinichi Mochizuki's proof of the ABC Conjecture, along with the current situation and how we can begin to understand this theory], Joseph Heavner, Quora, Aug 18 2013<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=6514 Latest on abc], Not Even Wrong, 19 Dec 2013<br />
*[https://plus.google.com/+RichardElwes/posts/jMVfRcnRaoV Richard Elwes, Google+], 20 Dec 2013<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/hK66h2artZc Mochizuki's Frobenioid reconstruction: the final bit] lieven lebruyn Google+, 12 July 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, May 10, 2013.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=8524ABC conjecture2013-07-13T00:25:34Z<p>MarioKappa: /* 2013 study of Geometry of Frobenioids */ finally he continued :-)</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/hK66h2artZc Mochizuki's Frobenioid reconstruction: the final bit] lieven lebruyn Google+, 12 July 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, May 10, 2013.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=7765ABC conjecture2013-06-11T17:01:13Z<p>MarioKappa: /* 2013 study of Geometry of Frobenioids */</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/SGM3gcvyoP1 my problem with Mochizuki's Frobenioid1] lieven lebruyn Google+, 11 June 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, May 10, 2013.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=7656ABC conjecture2013-06-09T12:44:32Z<p>MarioKappa: /* 2013 study of Geometry of Frobenioids */</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-3 MinuteMochizuki 3], lieven lebruyn Google+, 9 June 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, May 10, 2013.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=7634ABC conjecture2013-06-08T17:47:17Z<p>MarioKappa: added two G+ entries by lieven lebruyn</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki<br />
# [http://www.kurims.kyoto-u.ac.jp/~motizuki/Panoramic%20Overview%20of%20Inter-universal%20Teichmuller%20Theory.pdf A Panoramic Overview of Inter-universal Teichmuller Theory], Shinichi Mochizuki<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy. Go Yamashita has a [http://www.kurims.kyoto-u.ac.jp/~motizuki/FAQ%20on%20Inter-Universality.pdf short FAQ on inter-universality], which is a concept that appears in Mochizuki's arguments, though it does not appear to be the central ingredient in these papers.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://mochizukidenial.wordpress.com/ Mochizuki Denial], 14 Sept 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/hJQoYM2FS6g in IUTeich the theta function corresponds to the gaze of the little girl into the “small house”], lieven lebruyn Google+, 27 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/FWU8YD6xnNY MochizukiDenial], lieven lebruyn Google+, 28 May 2013<br />
<br />
===2013 study of Geometry of Frobenioids===<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/Y1XVCDLWRP5 a baby Arithmetic Frobenioid], lieven lebruyn Google+, 29 May 2013<br />
*[https://plus.google.com/u/0/115831511988650789490/posts/dx5vuxVewzN MinuteMochizuki 2 : a quadratic arithmetic Frobenioid], lieven lebruyn Google+, 31 May 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-1 MinuteMochizuki 1], the bourbaki code, lieven's blog, 1 June 2013<br />
*[http://matrix.cmi.ua.ac.be/content/minutemochizuki-2 MinuteMochizuki 2], the bourbaki code, lieven's blog, 1 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/Y7okWptRtEW Mochizuki's menagerie of morphisms], lieven lebruyn Google+, 4 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/aYDv916LeEi Mochizuki's categorical prime number sieve], lieven lebruyn Google+, 5 June 2013<br />
*[https://plus.google.com/115831511988650789490/posts/4qxuDqXPgug Mochizuki's Frobenioids for the Working Category Theorist], lieven lebruyn Google+, 7 June 2013<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
*[http://projectwordsworth.com/the-paradox-of-the-proof/ The Paradox of the Proof], Caroline Chen, May 10, 2013.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=7445ABC conjecture2013-04-02T19:51:29Z<p>MarioKappa: added a recent news page</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of four papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki, 30 August 2012<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.<br />
*[http://www.sciencenews.org/view/generic/id/349199/description/A_theorem_in_limbo_shows_that_QED_is_not_the_last_word_in_a_mathematical_proof A theorem in limbo shows that QED is not the last word in a mathematical proof], March 25, 2013.</div>MarioKappahttps://michaelnielsen.org/polymath/index.php?title=ABC_conjecture&diff=6830ABC conjecture2012-12-02T20:48:25Z<p>MarioKappa: Added a recent news page</p>
<hr />
<div>The '''abc conjecture''' asserts, roughly speaking, that if a+b=c and a,b,c are coprime, then a,b,c cannot all be too smooth; in particular, the product of all the primes dividing a, b, or c has to exceed <math>c^{1-\varepsilon}</math> for any fixed <math>\varepsilon > 0</math> (if a,b,c are smooth).<br />
<br />
This shows for instance that <math>(1-\varepsilon) \log N / 3</math>-smooth a,b,c of size N which are coprime cannot sum to form a+b=c. This unfortunately seems to be too weak to be of much use for the [[finding primes]] project.<br />
<br />
A probabilistic heuristic justification for the ABC conjecture can be found at [http://terrytao.wordpress.com/2012/09/18/the-probabilistic-heuristic-justification-of-the-abc-conjecture/ this blog post].<br />
<br />
* [[wikipedia:Abc_conjecture|Wikipedia page for the ABC conjecture]]<br />
* [http://ncatlab.org/nlab/show/abc%20conjecture nLab page for the ABC conjecture]<br />
* [http://www.ams.org/notices/200002/fea-mazur.pdf Questions about Powers of Numbers], Notices of the AMS, February 2000.<br />
* [http://www.ams.org/notices/200210/fea-granville.pdf It's As Easy As abc], Andrew Granville and Thomas J. Tucker, Notices of the AMS, November 2002.<br />
<br />
==Mochizuki's proof==<br />
<br />
=== Papers ===<br />
Mochizuki's claimed proof of the abc conjecture is conducted primarily through the following series of four papers:<br />
<br />
# (IUTT-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20I.pdf Inter-universal Teichmuller Theory I: Construction of Hodge Theaters], Shinichi Mochizuki<br />
# (IUTT-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20II.pdf Inter-universal Teichmuller Theory II: Hodge-Arakelov-theoretic Evaluation], Shinichi Mochizuki<br />
# (IUTT-III) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20III.pdf Inter-universal Teichmuller Theory III: Canonical Splittings of the Log-theta-lattice], Shinichi Mochizuki<br />
# (IUTT-IV) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV.pdf Inter-universal Teichmuller Theory IV: Log-volume Computations and Set-theoretic Foundations], Shinichi Mochizuki, 30 August 2012<br />
<br />
See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Brief%20Introduction%20to%20Inter-universal%20Geometry%20(Tokyo%202004-01).pdf these earlier slides] of Mochizuki on inter-universal Teichmuller theory. The answers to [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture this MathOverflow post] (and in particular [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/106658#106658 Minhyong Kim's answer]) describe the philosophy behind Mochizuki's proof strategy.<br />
<br />
The argument also relies heavily on Mochizuki's previous work on the Hodge-Arakelov theory of elliptic curves, including the following references:<br />
<br />
* (HAT) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves.pdf The Hodge-Arakelov Theory of Elliptic Curves: Global Discretization of Local Hodge Theories], Shinichi Mochizuki<br />
* (GTKS) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Galois-Theoretic%20Kodaira-Spencer%20Morphism%20of%20an%20Elliptic%20Curve.pdf The Galois-Theoretic Kodaira-Spencer Morphism of an Elliptic Curve], Shinichi Mochizuki<br />
* (HAT-Survey-I) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20I.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves I], Shinichi Mochizuki<br />
* (HAT-Survey-II) [http://www.kurims.kyoto-u.ac.jp/~motizuki/A%20Survey%20of%20the%20Hodge-Arakelov%20Theory%20of%20Elliptic%20Curves%20II.pdf A Survey of the Hodge-Arakelov Theory of Elliptic Curves II], Shinichi Mochizuki<br />
* (AbsTopIII) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Topics%20in%20Absolute%20Anabelian%20Geometry%20III.pdf Topics in Absolute Anabelian Geometry III: Global Reconstruction Algorithms], Shinichi Mochizuki, RIMS Preprint 1626 (March 2008).<br />
* (EtTh) [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations.pdf The Etale Theta Function and its Frobenioid-theoretic Manifestations], S. Mochizuki, Publ. Res. Inst. Math. Sci. 45 (2009), pp. 227-349. (See also [http://www.kurims.kyoto-u.ac.jp/~motizuki/The%20Etale%20Theta%20Function%20and%20its%20Frobenioid-theoretic%20Manifestations%20(comments).pdf this list] of errata for the paper.)<br />
<br />
Anyone seeking to get a thorough "bottom-up" understanding of Mochizuki's argument will probably be best advised to start with these latter papers first. The papers (AbsTopIII), (EtTh) are directly cited heavily by the IUTT series of papers; the earlier papers (HAT), (GTKS) cover thematically related material but serve more as inspiration than as a source of mathematical results in the IUTT series.<br />
<br />
The theory of (IUTT I-IV) is used to establish a Szpiro-type inequality, which is similar to [http://en.wikipedia.org/wiki/Szpiro's_conjecture Szpiro's conjecture] but with an additional genericity hypothesis on a certain parameter <math>\ell</math>. In order to then deduce the true Szpiro's conjecture (which is essentially equivalent to the abc conjecture), the results from the paper<br />
<br />
* (GenEll) [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position.pdf Arithmetic Elliptic Curves in General Position], S. Mochizuki, Arithmetic Elliptic Curves in General Position,Math. J. Okayama Univ. 52 (2010), pp. 1-28.<br />
<br />
are used. (Note that the published version of this paper requires some small corrections, listed [http://www.kurims.kyoto-u.ac.jp/~motizuki/Arithmetic%20Elliptic%20Curves%20in%20General%20Position%20(comments).pdf here].) See [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107386#107386 this MathOverflow post of Vesselin Dimitrov] for more discussion.<br />
<br />
Here are the remainder of [http://www.kurims.kyoto-u.ac.jp/~motizuki/papers-english.html Shinichi Mochizuki's papers], and here is the [http://en.wikipedia.org/wiki/Shinichi_Mochizuki Wikipedia page for Shinichi Mochizuki].<br />
<br />
===Specific topics===<br />
<br />
* The last part of (IUTT-IV) explores the use of different models of ZFC set theory in order to more fully develop inter-universal Teichmuller theory (this part is not needed for the applications to the abc conjecture). There appears to be an inaccuracy in a remark in Section 3, page 43 of that paper regarding the conservative nature of the extension of ZFC by the addition of the Grothendieck universe axiom; see [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/#comment-10605 this blog comment]. However, this remark was purely for motivational purposes and does not impact the proof of the abc conjecture.<br />
<br />
* There is some discussion at [http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture/107279#107279 this MathOverflow post] as to whether the explicit bounds for the abc conjecture are too strong to be consistent with known or conjectured lower bounds on abc. In particular, there appears to be a serious issue with the main Diophantine inequality (Theorem 1.10 of IUTT-IV), in that it appears to be inconsistent with commonly accepted conjectures, namely the abc conjecture and the uniform Serre open image conjecture. Mochizuki has written [http://www.kurims.kyoto-u.ac.jp/~motizuki/Inter-universal%20Teichmuller%20Theory%20IV%20(comments).pdf comments] in October 2012 to say that he hopes to post a revised version of Theorem 1.10 and its proof in the not too distant future.<br />
<br />
* The question of whether the results in this paper can be made completely effective (which would be of importance for several applications) is discussed in some of the comments to [http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ this blog post].<br />
<br />
* The category and topos theory viewpoint is discussed at the [http://nforum.mathforge.org/discussion/4260/abc-conjecture nForum page for the abc conjecture].<br />
<br />
===Blogs===<br />
*[http://sbseminar.wordpress.com/2012/06/12/abc-conjecture-rumor-2/ ABC conjecture rumor], Secret Blogging Seminar, 12 June, 2012<br />
*[http://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ Mochizuki on ABC], Quomodocumque, Jordan Ellenberg, 3 Sept, 2012<br />
*[http://richardelwes.co.uk/2012/09/04/as-easy-as-123/ As easy as 123…], Simple City, Richard Elwes' Blog, 4 Sept, 2012<br />
*[https://plus.google.com/103703080789076472131/posts/j1sEGnPyiRu Timothy Gowers Google+], 4 Sept, 2012<br />
*[https://plus.google.com/117663015413546257905/posts/Npu7xDniXMS John Baez Google+], 4 Sept 2012, see also a [https://plus.google.com/117663015413546257905/posts/2vTzJJSueRb repost]<br />
**[https://plus.google.com/117663015413546257905/posts/hzqBCeujWEg John Baez Google+], 5 Sept, 2012<br />
**[https://plus.google.com/117663015413546257905/posts/d1RsN4KnCUs John Baez Google+], 12 Sept, 2012, by Minhyong Kim.<br />
*[https://plus.google.com/114134834346472219368/posts/c7LkaWV69KL Terence Tao Google+], 4 Sept, 2012<br />
*[http://www.math.columbia.edu/~woit/wordpress/?p=5104 Proof of the abc Conjecture?], Not Even Wrong, 4 Sept, 2012<br />
*[http://gaussianos.com/posible-demostracion-de-la-veracidad-de-la-conjetura-abc/ Posible demostración de la veracidad de la conjetura ABC], Gaussianos, 5 Sept, 2012.<br />
*[http://bit-player.org/2012/the-abc-game The abc game], bit-player, 7 Sept, 2012<br />
*[http://oumathclub.wordpress.com/2012/09/09/the-abc-conjecture/ The abc Conjecture], U. Oklahoma math club, 9 Sept, 2012<br />
*[http://golem.ph.utexas.edu/category/2012/09/the_axgrothendieck_theorem_acc.html The Ax-Grothendieck Theorem According to Category Theory], The n-Category Café, 10 Sept, 2012<br />
*[http://www.oblomovka.com/wp/2012/09/11/touch-of-the-galois/ touch of the galois], Oblomovka, 11 Sept, 2012<br />
*[http://rjlipton.wordpress.com/2012/09/12/the-abc-conjecture-and-cryptography/ The ABC Conjecture And Cryptography], Gödel’s Lost Letter and P=NP, 12 Sept, 2012<br />
*[http://leisureguy.wordpress.com/2012/09/16/abc-proof-opens-new-vistas-in-math/ “ABC” proof opens new vistas in math], Later On, 16 Sept, 2012<br />
*[http://mathbabe.org/2012/11/14/the-abc-conjecture-has-not-been-proved The ABC Conjecture has not been proved], Mathbabe, 14 Nov, 2012.<br />
<br />
===Q & A===<br />
*[http://mathoverflow.net/questions/852/what-is-inter-universal-geometry What is inter-universal geometry?], Mathoverflow, 17 Oct, 2009<br />
*[http://mathoverflow.net/questions/106321/mochizukis-proof-and-siegel-zeros Mochizuki’s proof and Siegel zeros], Mathoverflow, 4 Sept, 2012<br />
*[http://mathoverflow.net/questions/106560/philosophy-behind-mochizukis-work-on-the-abc-conjecture Philosophy behind Mochizuki's work on the ABC conjecture], Mathoverflow, 7 Sept, 2012 (see also [http://meta.mathoverflow.net/discussion/1438/mochizuki-proof-of-abc the metapost] for this question)<br />
*[http://cstheory.stackexchange.com/questions/12504/implications-of-proof-of-abc-conjecture-for-cs-theory Implications of proof of abc conjecture for cs theory], Theoretical Computer Science Stackexchange, 11 Sept, 2012<br />
*[http://mathoverflow.net/questions/107379/model-theoretic-content-of-mochizukis-teichmuller-theory-papers Model-theoretic content of Mochizuki’s Teichmüller theory papers], Mathoverflow, 17 Sept 2012<br />
*[http://math.stackexchange.com/questions/199609/groupification-and-perfection-of-a-commutative-monoid Groupification and perfection of a commutative monoid], Mathematics Stackexchange, 20 Sept 2012<br />
Note that Mathoverflow has a number of policies and guidelines regarding appropriate questions and answers to post on that site; see [http://mathoverflow.net/faq this FAQ for details].<br />
<br />
===News Media===<br />
*[http://www.nature.com/news/proof-claimed-for-deep-connection-between-primes-1.11378 Proof claimed for deep connection between primes], Nature News, 10 September 2012, reprinted by Scientific American<br />
*[http://www.newscientist.com/article/dn22256-fiendish-abc-proof-heralds-new-mathematical-universe.html Fiendish 'ABC proof' heralds new mathematical universe], New Scientist, 10 September 2012<br />
*[http://news.yahoo.com/mathematician-claims-proof-connection-between-prime-numbers-131737044.html Mathematician Claims Proof of Connection between Prime Numbers], Yahoo News, 11 Sept 2012, reprinted by Huffington Post and MSNBC<br />
*[http://news.sciencemag.org/sciencenow/2012/09/abc-conjecture.html ABC Proof Could Be Mathematical Jackpot], Science, 12 Sept 2012<br />
*[http://www.nytimes.com/2012/09/18/science/possible-breakthrough-in-maths-abc-conjecture.html A Possible Breakthrough in Explaining a Mathematical Riddle], The New York Times, 17 Sept 2012<br />
*[http://www.telegraph.co.uk/news/worldnews/asia/japan/9552155/Worlds-most-complex-mathematical-theory-cracked.html World's most complex mathematical theory 'cracked'], The Telegraph, 19 Sept 2012, reprinted by several other news outlets<br />
*[http://www.dailyprincetonian.com/2012/09/20/31183/ U.-educated mathematician offers proof of pivotal number theory conjecture], The Daily Princetonian, 20 Sept 2012<br />
*[http://bostonglobe.com/ideas/2012/11/03/abc-proof-too-tough-even-for-mathematicians/o9bja4kwPuXhDeDb2Ana2K/story.html An ABC proof too tough even for mathematicians], Kevin Hartnett, 3 Nov 2012.<br />
<br />
===Crowd News===<br />
*[http://news.ycombinator.com/item?id=4476367 Shin Mochizuki has released his long-rumored proof of the ABC conjecture ], Hacker News, 5 Sept 2012<br />
**[http://news.ycombinator.com/item?id=4502856 Proof Claimed for Deep Connection between Prime Numbers], Hacker News, 11 Sept 212<br />
*[http://science.slashdot.org/story/12/09/10/226217/possible-proof-of-abc-conjecture Possible Proof of ABC Conjecture], Slashdot, September 10, 2012<br />
*[http://www.metafilter.com/119847/Mathematics-world-abuzz-with-a-proof-of-the-ABC-Conjecture Mathematics world abuzz with a proof of the ABC Conjecture], MetaFilter, 11 Sept 2012<br />
*[http://theconversation.edu.au/the-abc-conjecture-as-easy-as-1-2-3-or-not-10836 The abc conjecture, as easy as 1, 2, 3 ... or not ], The Conversation, Alexandru Ghitza, 26 Nov 2012.</div>MarioKappa