Levi Subgroup Actions on Schubert Varieties, Induced Decompositions of their Coordinate Rings, and Sphericity Consequences

Abstract

Let Lw be the Levi part of the stabilizer Qw in GLN (for left multiplication) of a Schubert variety X(w) in the Grassmannian Gd,N. For the natural action of Lw on C[X(w)], the homogeneous coordinate ring of X(w) (for the Pl\"ucker embedding), we give a combinatorial description of the decomposition of C[X(w)] into irreducible Lw-modules; in fact, our description holds more generally for the action of the Levi part L of any parabolic subgroup Q that is contained in Qw. This decomposition is then used to show that all smooth Schubert varieties, all determinantal Schubert varieties, and all Schubert varieties in G2,N are spherical Lw-varieties.