M=13 case of FUNC: Difference between revisions
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On this page, we attempt a proof of the m=13 case of Frankl's conjecture. This will probably end up being a long case analysis, with the cases being tackled out of order, so bear with me while the page is in progress. In all results below, we will try to prove that the set <math>\mathcal{A}</math> is Frankl's (satisfies the conjecture), but will assume the opposite. We will | On this page, we attempt a proof of the m=13 case of Frankl's conjecture. This will probably end up being a long case analysis, with the cases being tackled out of order, so bear with me while the page is in progress. In all results below, we will try to prove that the set <math>\mathcal{A}</math> is Frankl's (satisfies the conjecture), but will assume the opposite. We will use the terminology defined in the paper "The 11 element case of Frankl's Conjecture" by Ivica Bosnjak and Petar Markovic. | ||
The smallest size of a non-empty set must be 3, 4, 5, or 6, as if there were a set of size 1 or 2 in <math>\mathcal{A}</math>, it would be Frankl's. Also, if all the nonempty sets have size 7 or larger, then the average set size is greater than 13/2=6.5, so <math>\mathcal{A}</math> is Frankl's (to prove this more rigorously, use the uniform weight function over all the elements in X (the ground set). | The smallest size of a non-empty set must be 3, 4, 5, or 6, as if there were a set of size 1 or 2 in <math>\mathcal{A}</math>, it would be Frankl's. Also, if all the nonempty sets have size 7 or larger, then the average set size is greater than 13/2=6.5, so <math>\mathcal{A}</math> is Frankl's (to prove this more rigorously, use the uniform weight function over all the elements in X (the ground set). | ||
==Case 1: The smallest set has size 3== | ==Case 1: The smallest set has size 3== | ||
Revision as of 02:57, 27 October 2016
On this page, we attempt a proof of the m=13 case of Frankl's conjecture. This will probably end up being a long case analysis, with the cases being tackled out of order, so bear with me while the page is in progress. In all results below, we will try to prove that the set [math]\displaystyle{ \mathcal{A} }[/math] is Frankl's (satisfies the conjecture), but will assume the opposite. We will use the terminology defined in the paper "The 11 element case of Frankl's Conjecture" by Ivica Bosnjak and Petar Markovic.
The smallest size of a non-empty set must be 3, 4, 5, or 6, as if there were a set of size 1 or 2 in [math]\displaystyle{ \mathcal{A} }[/math], it would be Frankl's. Also, if all the nonempty sets have size 7 or larger, then the average set size is greater than 13/2=6.5, so [math]\displaystyle{ \mathcal{A} }[/math] is Frankl's (to prove this more rigorously, use the uniform weight function over all the elements in X (the ground set).
