Short sequences statistics: Difference between revisions
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corrected several errors |
added some data, and link to multiplicative data |
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Here are statistics on short sequences obtained with Alec's code. Feel free to add more. | Here are statistics on short sequences obtained by hand or with Alec's code. Feel free to add more. | ||
For a discrepancy C=2 there are: | For a discrepancy C=2 there are: | ||
* | * 6 sequences of length 3 | ||
* | * 12 sequences of length 4 | ||
* | * 18 sequences of length 5 | ||
* 18 sequences of length 6 | |||
* ... | |||
* 8 436 986 sequences of length 48, of which 89 are multiplicative | |||
* ... | |||
* ????? sequences of length 96, of which 119 are multiplicative | |||
* ????? ? sequences of length 192, of which 304 are multiplicative | |||
More precise data about multiplicave sequences themselves is available [http://michaelnielsen.org/polymath1/index.php?title=Multiplicative_sequences on this page]. | |||
Revision as of 06:36, 13 January 2010
Click here to go back to the main experimental results page.
Here are statistics on short sequences obtained by hand or with Alec's code. Feel free to add more.
For a discrepancy C=2 there are:
- 6 sequences of length 3
- 12 sequences of length 4
- 18 sequences of length 5
- 18 sequences of length 6
- ...
- 8 436 986 sequences of length 48, of which 89 are multiplicative
- ...
- ????? sequences of length 96, of which 119 are multiplicative
- ????? ? sequences of length 192, of which 304 are multiplicative
More precise data about multiplicave sequences themselves is available on this page.
