p-adic variation of unit root L-functions
Number Theory
2017-04-19 v1
Abstract
Dwork's conjecture, now proven by Wan, states that unit root L-functions "coming from geometry" are p-adic meromorphic. In this paper we study the p-adic variation of a family of unit root L-functions coming from a suitable family of toric exponential sums. In this setting, we find that the unit root L-functions each have a unique p-adic unit root. We then study the variation of this unit root over the family of unit root L-functions. Surprisingly, we find that this unit root behaves similarly to the classical case of families of exponential sums. That is, the unit root is essentially a ratio of A-hypergeometric functions.
Keywords
Cite
@article{arxiv.1512.06258,
title = {p-adic variation of unit root L-functions},
author = {C. Douglas Haessig and Steven Sperber},
journal= {arXiv preprint arXiv:1512.06258},
year = {2017}
}
Comments
24 pages