Unipotent Representations of Complex Groups and Extended Sommers Duality

Abstract

Let G be a complex reductive algebraic group. In arXiv:2108.03453, we have defined a finite set of irreducible admissible representations of G called `unipotent representations', generalizing the special unipotent representations of Arthur and Barbasch-Vogan. These representations are defined in terms of filtered quantizations of symplectic singularities and are expected to form the building blocks of the unitary dual of G. In this paper, we provide a description of these representations in terms of the Langlands dual group G. To this end, we construct a duality map D from the set of pairs (O,C) consisting of a nilpotent orbit O ⊂ g and a conjugacy class C in Lusztig's canonical quotient A(O) to the set of finite covers of nilpotent orbits in g*.