Gelfand pairs for affine Weyl groups

Abstract

This paper is motivated by several combinatorial actions of the affine Weyl group of type Cn. Addressing a question of David Vogan, it was shown in an earlier paper that these permutation representations are essentialy multiplicity-free~arXiv:2009.13880. However, the Gelfand trick, which was indispensable in~arXiv:2009.13880 to prove this property for types Cn and Bn, is not applicable for other classical types. Here we present a unified approach to fully answer the analogous question for all irreducible affine Weyl groups. Given a finite Weyl group W with maximal parabolic subgroup P≤ W, there corresponds to it a reflection subgroup H of the affine Weyl group W. It turns out that while the Gelfand property of P≤ W does not imply that of H≤ W, but Q=NW(P)≤ W has the Gelfand property if and only if K=QH≤ W has. Finally, for each irreducible type we describe when (W,Q) is a Gelfand pair.