Germ expansion for SL(2) in arbitrary characteristics

Abstract

Let F be a local field of characteristic p and G be a connected reductive group over F. Recall that Shalika's germ expansion of orbital integrals of regular semi-simple elements near the identity, when it exists, is a sum indexed by the set of unipotent conjugacy classes in G(F). Observe that if G=SL(2) this set is always compact; it is finite if p2 while it is uncountable if p= 2. As a consequence, Shalika's germ expansion for elliptic elements does not make sense if p=2. On the other hand the endoscopic expansion of elliptic orbital integrals always exists and yields a germ expansion equivalent if p2 (up to a Fourier transform) to Shalika's germ expansion but is new if p=2. A conjecture for arbitrary groups is stated.