On Shalika germs

Abstract

Let G be a reductive group over a local field F satisfying the assumptions of Deb1, Greg⊂ G the subset of regular elements. Let T⊂ G be a maximal torus. We write Treg=T Greg. Let dg ,dt be Haar measures on G and T. They define an invariant measure dg/dt on G/T. Let H be the space of complex valued locally constant functions on G with compact support. For any f∈ H ,t∈ Treg we define It(f)=∫G/Tf( gt g-1)dg/dt. Let P be the set of conjugacy classes of unipotent elements in G. For any ∈ P we fix an invariant measure ω on . As well known R for any f∈ H the integral I (f)=∫ fω is absolutely convergent. Shalika Sh has shown that there exist functions j (t), ∈ P on T Greg such that It(f) = Σ ∈ P j(t) I(f) () for any f∈ H ,t∈ T near to e where the notion of near depends on f. For any positive real number r one defines an open Ad-invariant subset Gr of G and a subspace Hr as in Deb1. In this paper I show that for any f∈ Hr the equality () is true for all t∈ Treg Gr.