Weil conjectures
Conjectures made by Weil on the form of the zeta function of a variety over a finite field. Specifically he thought it should be rational, it should split into polynomial parts with integral coefficients, with roots of a certain magnitude, and of degree = Betti number. Further there should be a functional equation.
(Flesh this out ;))
Title | Weil conjectures |
---|---|
Canonical name | WeilConjectures |
Date of creation | 2013-03-22 15:43:17 |
Last modified on | 2013-03-22 15:43:17 |
Owner | nerdy2 (62) |
Last modified by | nerdy2 (62) |
Numerical id | 6 |
Author | nerdy2 (62) |
Entry type | Conjecture |
Classification | msc 14G15 |
Classification | msc 14G10 |
Classification | msc 14G05 |