A number field analogue of Weil's theorem on congruent zeta functions

Abstract

Let K be a function field of one variable over a finite field F. Weil's celebrated theorem states that the congruent zeta function of K/F is determined by the Gal(F/F)-module structure of XFK(p)ZpQp, and vise versa, where p is a prime number different from the characteristic of K and XFK(p) stands for the Galois group of the maximal unramified abelian p-extension over FK. In the present paper, I will give a number field analogue of the above mentioned theorem by considering the total cyclotomic extension, which we may regard as a number field analogue of FK/K.