All reductive p-adic groups are tame

Let \(G\) be a reductive group over a local non-archimedean field \(F\) of zero characteristic. For a finite group it is well known that the theory of representations over an algebraically closed field of characteristic which does not divide the order for the group, is the same than over the complex

A p-group P is called resistant if, for any finite group G having P as a Sylow p-subgroup, the normalizer N G P controls p-fusion in G. The aim of this paper is to prove that any generalized extraspecial p-group P is resistant, excepting the case when P = E × A, where A is elementary abelian and E i

Schneider and Stuhler have defined Euler᎐Poincare functions of irreducible ŕepresentations of reductive p-adic groups and calculated their orbital integrals. Orbital integrals belong to a larger family of invariant distributions appearing in the geometric side of the Arthur᎐Selberg trace formula. We