Integrable crystals and restriction to Levi via generalized slices in the affine Grassmannian

Abstract

Let G be a connected reductive algebraic group over C. Let +G be the monoid of dominant weights of G. We construct the integrable crystals BG(λ),\ λ∈+G, using the geometry of generalized transversal slices in the affine Grassmannian of the Langlands dual group. We construct the tensor product maps pλ1,λ2 BG(λ1) BG(λ2) → BG(λ1+λ2)\0\ in terms of multiplication of generalized transversal slices. Let L ⊂ G be a Levi subgroup of G. We describe the restriction to Levi ResGLRep(G)→Rep(L) in terms of the hyperbolic localization functors for the generalized transversal slices.