Twisting lemma for -adic modules

Abstract

A classical twisting lemma says that given a finitely generated torsion module M over the Iwasawa algebra Zp[[ ]] with Zp, \ ∃ a continuous character θ: → Zp× such that, the n-Euler characteristic of the twist M(θ) is finite for every n. This twisting lemma has been generalized for the Iwasawa algebra of a general compact p-adic Lie group G. In this article, we consider a further generalization of the twisting lemma to T[[G]] modules, where G is a compact p-adic Lie group and T is a finite extension of Zp[[X]]. Such modules naturally occur in Hida theory. We also indicate arithmetic application by considering the twisted Euler Characteristic of the big Selmer (respectively fine Selmer) group of a -adic form over a p-adic Lie extension.