Intertwining Algebras and Affine Hecke Algebras for Finite Central Extensions of Classical p-adic Groups with Application to Metaplectic Groups

Abstract

For a finite central extension G of a classical p-adic reductive group, we consider the endomorphism algebra of some induced projective generator \`a la Bernstein of the category of smooth representations of G. In the case where the Levi subgroups decompose, we can compute this algebra to get a result similar to the one previously obtained by the first author for classical p-adic groups, showing that this intertwining algebra is a twisted semi-direct product of an affine Hecke algebra with parameters by a twisted finite group algebra. We discuss also the general case. We give then an application to the category of genuine representations of a p-adic metaplectic group. Using results of C. M glin relative to the Howe correspondence, we show that the Bernstein components of these groups are equivalent to tensor products of categories of unipotent representations of classical groups. This generalizes a previous result of the first author. It implies an equivalence of categories between the category of genuine representations of the p-adic metaplectic group and the direct sums of those of smooth representations of the corresponding odd special orthogonal group and its pure inner form.