Non-commutative twisted Euler characteristic

Abstract

It is well known that given a finitely generated torsion module M over the Iwasawa algebra Zp[[]], where Zp, there exists a continuous p-adic character of such that, for the twist M() of M, the n := pn Euler characteristic, i.e. (n, M()), is finite for every n. We prove a generalization of this result by considering modules over the Iwasawa algebra of a general p-adic Lie group G, instead of . We relate this twisted Euler characteristic to the evaluation of the Akashi series at the twist and in turn use it to indicate some application to the Iwasawa theory of elliptic curves. This article is a natural generalization of the result established in [JOZ].