The Iwahori--Matsumoto dual for tempered representations of Lusztig's geometric Hecke algebras

Abstract

The graded Iwahori--Matsumoto involution IM is an algebra involution on a graded Hecke algebra closely related to the more well-known Iwahori--Matsumoto involution on an affine Hecke algebra. It induces an involution on the Grothendieck group of complex finite-dimensional representations of H. When H is a geometric graded Hecke algebra (in the sense of Lusztig) associated to a connected complex reductive group G, the irreducible representations of H are parametrised by a set M consisting of certain G-conjugacy classes of quadruples (e,s,r0,) where r0 ∈ C, e ∈ Lie(G) is nilpotent, s ∈ Lie(G) is semisimple, and is some irreducible representation of the group of components of the simultaneous centraliser of (e,s) in G. Let Y be an irreducible tempered representation of H with real infinitesimal character. Then IM( Y) = Y(e',s,r0,') for some (e',s,r0,') ∈ M. The main result of this paper is to give an explicit algorithm that computes the G-orbit of e' for G = Sp(2n,C) and G = SO(N,C). As a key ingredient of the main result, we also prove a generalisation of the main theorems of Waldspurger 2019 (for Sp(2n,C)) and La 2024 (for SO(N,C)) regarding certain maximality properties of generalised Springer representations.