Quantum K-theoretic geometric Satake

Abstract

The geometric Satake correspondence gives an equivalence of categories between the representations of a semisimple group G and the spherical perverse sheaves on the affine Grassmannian Gr of its Langlands dual group. Bezrukavnikov-Finkelberg developed a derived version of this equivalence which relates the derived category of G-equivariant constructible sheaves on Gr with the category of G-equivariant O( g)-modules. In this paper, we develop a K-theoretic version of the derived geometric Satake which involves the quantum group Uq g . We define a convolution category KConv(Gr) whose morphism spaces are given by the G × C× -equivariant algebraic K-theory of certain fibre products. We conjecture that KConv(Gr) is equivalent to a full subcategory of the category of Uq g -equivariant Oq(G) -modules. We prove this conjecture when G = SLn. A key tool in our proof is the SLn spider, which is a combinatorial description of the category of Uq sln representations. By applying horizontal trace, we show that the annular SLn spider describes the category of Uq sln -equivariant Oq(SLn) -modules. Then we use quantum loop algebras to relate the annular SLn spider to KConv(Gr) . This gives a combinatorial/diagrammatic description of both categories and proves our conjecture.