Fonctions dont les int\'egrales orbitales et celles de leurs transform\'ees de Fourier sont \`a support topologiquement nilpotent

Abstract

Let F be a p-adic field and let G be a connected reductive group defined over F. We assume p is big. Denote g the Lie algebra of G. To each vertex s of the reduced Bruhat-Tits' building of G, we associate as usual a reductive Lie algebra gs defined over the residual field Fq. We normalize suitably a Fourier-transform f f on Cc∞(g(F)). We study the subspace of functions f∈ Cc∞(g(F)) such that the orbital integrals of f and of f are 0 for each element of g(F) which is not topologically nilpotent. This space is related to the characteristic functions of the character-sheaves on the spaces gs( Fq), for each vertex s, which are cuspidal and with nilpotent support. We prove that our subspace behave well under endoscopy.