A combinatorial study of affine Schubert varieties in affine Grassmannian

Abstract

Let Xλ be the closure of the I-orbit Xλ in the affine Grassmanian Gr of a simple algebraic group G of adjoint type, where I is the Iwahori group and λ is a coweight of G. We find a simple algorithm which describes the set (λ) of all I-orbits in Xλ in terms of coweights. We introduce R-operators (associated to positive roots) on the coweight lattice of G, which exactly describe the closure relation of I-orbits. These operators satisfy Braid relations generically on the coweight lattice. We also establish a duality between the set (λ) and the weight system of the level one affine Demazure module Dλ of Lg indexed by λ, where Lg is the affine Kac-Moody algebra dual to the affine Kac-Moody Lie algebra g associated to the Lie algebra g of G.