Action of Hecke algebra on the double flag variety of type AIII

Abstract

Consider a connected reductive algebraic group G and a symmetric subgroup K . Let X = K/BK × G/P be a double flag variety of finite type, where BK is a Borel subgroup of K , and P a parabolic subgroup of G . A general argument shows that the orbit space C\,X/K inherits a natural action of the Hecke algebra H = H(K, BK) of double cosets via convolutions. However, to find out the explicit structure of the Hecke module is a quite different problem. In this paper, we determine the explicit action of H on C\,X/K in a combinatorial way using graphs for the double flag variety of type AIII. As a by-product, we also get the description of the representation of the Weyl group on C\,X/K as a direct sum of induced representations.