Homological algebra for nonarchimedean completions of group algebras

Abstract

Let V be a complete discrete valuation ring, and let G be either a word-hyperbolic group or a reductive p-adic group. We prove that the canonical morphism V[G] V[G] from the group algebra to its dagger completion is an isocohomological morphism (also known as an idempotent or a homotopy epimorphism). This allows us to deduce homological properties about the algebra V[G] in terms of the relatively simpler group algebra of G. These properties are then used towards Hochschild and cyclic homology computations.

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