Lifting representations of finite reductive groups I: Semisimple conjugacy classes

Abstract

Suppose that G is a connected reductive group defined over a field k, and is a finite group acting via k-automorphisms of G satisfying a certain quasi-semisimplicity condition. Then the connected part of the group of -fixed points in G is reductive. We axiomatize the main features of the relationship between this fixed-point group and the pair (G,), and consider any group G, not just the -fixed points of G, satisfying the axioms. (In fact, the axioms do not require to act on all of G.) If both G and G are k-quasisplit, then we can consider their duals G* and G*. We show the existence of and give an explicit formula for a natural map from semisimple stable conjugacy classes in G*(k) to those in G*(k). If k is finite, then our groups are automatically quasisplit, and our result specializes to give a map from semisimple conjugacy classes in G*(k) to those in G*(k). Since such classes parametrize packets of irreducible representations of G(k) and G(k), one obtains a mapping of such packets.