Int\'egrales orbitales sur GL(N, Fq((t)))

Abstract

Let F be a non--Archimedean local field of characteristic ≥ 0, and let G=GL(N,F), N≥ 1. An element γ∈ G is said to be quasi--regular if the centralizer of γ in M(N,F) is a product of field extensions of F. Let G qr be the set of quasi--regular elements of G. For γ∈ G qr, we denote by Oγ the ordinary orbital integral on G associated with γ. In this paper, we replace the Weyl discriminant DG by a normalization factor ηG: G qr→ R>0 which allows us to obtain the same results as proven by Harish--Chandra in characteristic zero: for f∈ C∞ c(G), the normalized orbital integral IG(γ,f)=ηG1 2(γ)Oγ(f) is bounded on G, and for ε>0 such that N(N-1)ε <1, the function ηG-1 2-ε is locally integrable on G.