On structure constants of Iwahori-Hecke algebras for Kac-Moody groups

Abstract

We consider the Iwahori-Hecke algebra associated to an almost split Kac-Moody group G (affine or not) over a nonarchimedean local field K. It has a canonical double-coset basis (T w) w∈ W+ indexed by a sub-semigroup W+ of the affine Weyl group W. The multiplication is given by structure constants a u w, v∈ N=Z≥0 : T w*T v=Σ u∈ P w, v a u w, v T u. A conjecture, by Bravermann, Kazhdan, Patnaik, Gaussent and the authors, tells that a u w, v is a polynomial, with coefficients in N, in the parameters qi-1,q'i-1 of G over K. We prove this conjecture when w and v are spherical or, more generally, when they are said generic: this includes all cases of w, v∈ W+ if G is of affine or strictly hyperbolic type. In the split affine case (where qi=q'i=q, ∀ i) we get a universal Iwahori-Hecke algebra with the same basis (T w) w∈ W+ over a polynomial ring Z[Q]; it specializes to our Iwahori-Hecke algebra when one sets Q=q.