p-adic Theory for Partial Toric Exponential Sums

Abstract

Wan proved the rationality of partial toric L-functions using -adic techniques. In this paper, we present a p-adic proof in the spirit of Dwork. We demonstrate that partial L-functions can be expressed as an alternating product of twisted Fredholm determinants. These twisted determinants appear to be intrinsic to the analytic structure of partial L-functions, and unlike their classical counterparts, twisted Fredholm determinants of completely continuous operators are not automatically p-adic entire functions. However, for partial L-functions they will be p-adic meromorphic. After proving rationality, we construct a p-adic cohomology theory and give a p-adic cohomological formula for partial toric L-functions. Last, we show they have a unique p-adic unit root which may be explicitly written in terms of A-hypergeometric series.