$p$-adic Theory for Partial Toric Exponential Sums
Abstract
Wan proved the rationality of partial toric -functions using -adic techniques. In this paper, we present a -adic proof in the spirit of Dwork. We demonstrate that partial -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 -functions, and unlike their classical counterparts, twisted Fredholm determinants of completely continuous operators are not automatically -adic entire functions. However, for partial -functions they will be -adic meromorphic. After proving rationality, we construct a -adic cohomology theory and give a -adic cohomological formula for partial toric -functions. Last, we show they have a unique -adic unit root which may be explicitly written in terms of -hypergeometric series.
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Cite
@article{arxiv.2604.07330,
title = {$p$-adic Theory for Partial Toric Exponential Sums},
author = {C. Douglas Haessig},
journal= {arXiv preprint arXiv:2604.07330},
year = {2026}
}
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20 pages