Smooth representations and Hecke algebras of p-adic GLn(D)

Abstract

The main question we are going to address in this paper is: How much does the representation theory of the p-adic group GLn(D) depend on the p-adic division algebra D? Let D be a central division algebra defined over some locally compact non-archimedean local field. Using Bushnell-Kutzko theory of types and S\'echerre-Stevens decomposition of spherical Hecke algebras associated to types, we obtain that the cuspidal blocks in the Bernstein decomposition of the category R ( GLn(D) ) of smooth complex representations of GLn(D) do not depend on the p-adic division algebra D. In particular, when n=1 or 2, the category R ( GLn(D) ) does not depend on the p-adic division algebra D.