Geometrization of continuous characters of Zp×

Abstract

We define the p-adic trace of certain rank-one local systems on the multiplicative group over p-adic numbers, using Sekiguchi and Suwa's unification of Kummer and Artin-Schrier-Witt theories. Our main observation is that, for every non-negative integer n, the p-adic trace defines an isomorphism of abelian groups between local systems whose order divides (p-1)pn and -adic characters of the multiplicative group of p-adic integers of depth less than or equal to n.