Continuous Group Cohomology and Ext-Groups

Abstract

We prove that the continuous group cohomology groups of a locally profinite group G with coefficients in a smooth k -representation π of G are isomorphic to the Ext-groups ExtiG(1,π) computed in the category of smooth k -representations of G . We apply this to show that if π is a supersingular Fp -representation of GL2(Qp) , then the continuous group cohomology of SL2(Qp) with values in π vanishes. Furthermore, we prove that the continuous group cohomology groups of a p -adic reductive group G , with coefficients in an admissible unitary Qp -Banach space representation , are finite dimensional. We show that the continuous group cohomology of SL2(Qp) with values in non-ordinary irreducible Qp -Banach space representations of GL2(Qp) vanishes.

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