Reduced C*-algebras and K-theory for reductive p-adic groups

Abstract

We calculate the K-theory of the reduced C*-algebra C*r(G) of a reductive p-adic group G. To do so, we show that each direct summand in Plymen's Plancherel decomposition of C*r(G) is Morita equivalent to a twisted crossed product for an action of a finite group on the blow-up of a compact torus along the zero-locus of a certain Plancherel density. It follows that the K-theory of C*r(G) is the direct sum of the twisted equivariant K-theory groups of these blow-ups, which can be computed using an Atiyah-Hirzebruch spectral sequence. As an illustration, the case of Sp4 is treated in some detail. Our main result is obtained from a more general study of C*-algebras of compact operators on twisted equivariant Hilbert modules, from which we also recover results due to Wassermann for real groups, and to Afgoustidis and Aubert in the p-adic case.

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