The functor FGP at the level of K0

Abstract

Let G be a p-adic Lie group with reductive Lie algebra g. Denote by D(G) the locally analytic distribution algebra of G. Orlik-Strauch and Agrawal-Strauch have studied certain exact functors defined on various categories of g-representations with image in the category of locally analytic G-representations or D(G)-modules. In this paper we prove that for suitably defined categories of D(G)-modules, this functor gives rise to injective homomorphisms at the level of Grothendieck groups. We also explain how this functor interacts with translation functors at the level of Grothendieck groups.

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