Affine Springer fibers and depth zero L-packets

Abstract

Let G be a connected reductive group over a field F=Fq((t)) splitting over Fq((t)). Following [KV,DR], a tamely unramified Langlands parameter λ:WFL G(Q) in general position gives rise to a finite set λ of irreducible admissible representations of G(F), called the L-packet. The main goal of this work is to provide a geometric description of characters π of π∈λ and of their endoscopic linear combinations λ in terms of homology of affine Springer fibers, thus establishing an analog of Lusztig conjectures in this case. Furthermore, each λ can be described as the trace of Frobenius function of a conjugation equivariant perverse sheaf on the loop group by the sheaf-function correspondence. As another application, we prove that the sum λst:=Σπ∈λπ is stable and show that the λst's are compatible with inner twistings. More generally, we prove that each λ is Eλ,-stable.