K0-invariance of the completely faithful property of Iwasawa modules

Abstract

Let H be a compact p-adic analytic group without torsion element, whose Lie algebra is split semisimple and NH(G) be the full subcategory of the category of finitely generated modules over the Iwasawa algebra G that are also finitely generated as H-modules, where G = Zp × H. We show that if the class of a module N in the Grothendieck group of NH(G) equals to the class of a completely faithful module, then q(N) is also completely faithful, where q(N) denotes the image of N via the quotient functor modulo the full subcategory of pseudonull modules. We also generalize a Theorem of Konstantin Ardakov characterizing the completely faithful property to the case of more general p-adic Lie groups.