Hyperelliptic Curves, L-Polynomials, and Random Matrices

Author(s)

Kedlaya, Kiran S.; Sutherland, Andrew Victor

Abstract

We analyze the distribution of unitarized L-polynomials Lp(T) (as p varies) obtained from a hyperelliptic curve of genus g [less than or equal to] 3 defined over Q. In the generic case, we find experimental agreement with a predicted correspondence (based on the Katz-Sarnak random matrix model) between the distributions of Lp(T) and of characteristic polynomials of random matrices in the compact Lie group USp(2g). We then formulate an analogue of the Sato-Tate conjecture for curves of genus 2, in which the generic distribution is augmented by 22 exceptional distributions, each corresponding to a compact subgroup of USp(4). In every case, we exhibit a curve closely matching the proposed distribution, and can find no curves unaccounted for by our classification.

Date issued

2009-01

URI

http://hdl.handle.net/1721.1/64701

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Contemporary Mathematics

Publisher

American Mathematical Society

Citation

Kedlaya, Kiran S. and Andrew V. Sutherland. "Hyperelliptic Curves, L-Polynomials, and Random Matrices." in Arithmetic, Geometry, Cryptography, and Coding Theory: International Conference, November 5-9, 2007, CIRM, Marseilles, France. Gilles Lachaud, Christophe Ritzenthaler, Michael A. Tsfasman, editors. 2009. (Contemporary Mathematics ; v.487)

Version: Author's final manuscript

ISBN

978-0-8218-4716-9