Schubert calculus of Richardson varieties stable under spherical Levi subgroups

Abstract

We observe that the expansion in the basis of Schubert cycles for H*(G/B) of the class of a Richardson variety stable under a spherical Levi subgroup is described by a theorem of Brion. Using this observation, along with a combinatorial model of the poset of certain symmetric subgroup orbit closures, we give positive combinatorial descriptions of certain Schubert structure constants on the full flag variety in type A. Namely, we describe cu,vw when u and v are inverse to Grassmannian permutations with unique descents at p and q, respectively. We offer some conjectures for similar rules in types B and D, associated to Richardson varieties stable under spherical Levi subgroups of SO(2n+1,) and SO(2n,), respectively.