Repr\'esentations et quasi-caract\`eres de niveau 0; endoscopie

Abstract

Let F be a finite extension of Qp and let G be a connected reductive group over F. We assume that p is big relatively to G. Let G' be an endoscopic group of G. Following Arthur, we have, roughly speaking, a spectral transfer which, to a stable finite linear combination of irreducible admissible representations of G'(F), associates a finite linear combination of irreducible admissible representations of G(F). Let p0,G be the Bernstein's projector such that, for an irreducible admissible representation π of G(F), we have p0,G(π)=π if π has level 0 and p0,G(π)=0 if π has strictly positive level. Define similarly p0,G'. We prove that p0,G' preserves the space of stable finite linear combination of irreducible admissible representations of G'(F) and that p0,G transfer=transfer p0,G'.