P-adic Line Integrals and Cauchy's Theorems
Abstract
Working in the p-adic analog of the complex numbers, we'll define a line integral on a small arc of a circle. This allows new versions of the Residue Theorem, the Cauchy-Goursat Theorem on discs with and without holes, Cauchy's Integral Formula and the Z-P Theorem. In contrast to results in complex analysis, these integrals allow the points on a boundary circle, the bulk of a p-adic disc, to be treated the same as points interior to the boundary circle. The theory of the integral is developed, especially for functions holomorphic on an open disc, and integrals will be calculated for rational functions, Krasner analytic functions and some well-known functions that are not Krasner analytic. Some computations will produce values of Kubota-Leopoldt L-functions at ordinary integers.
Cite
@article{arxiv.1605.06484,
title = {P-adic Line Integrals and Cauchy's Theorems},
author = {Jack Diamond},
journal= {arXiv preprint arXiv:1605.06484},
year = {2016}
}
Comments
45 pages. Corrections were made to the wording of the definitions of path sequence and auxiliary function. Arguments and results are unchanged. Sections 5 was revised for improved clarity and minor improvements. 46 pages. Theorem 6.11 has been made stronger. No other results changed. Some unstated conditions put in for a couple of results. Exposition added. Typos fixed