A Categorical Approach to Subgroups of Quantum Groups and Their Crystal Bases

Abstract

Suppose that we have a semisimple, connected, simply connected algebraic group G with corresponding Lie algebra g. There is a Hopf pairing between the universal enveloping algebra U(g) and the coordinate ring O(G). By introducing a parameter q, we can consider quantum deformations Uq(g) and Oq(G) respectively, between which there again exists a Hopf pairing. We show that the category of crystals associated with Uq(g) is a monoidal category. We define subgroups of Uq(g) to be right coideal subalgebras, and subgroups of Oq(G) to be quotient left Oq(G)-module coalgebras. Furthermore, we discuss a categorical approach to subgroups of quantum groups which we hope will provide us with a link to crystal basis theory.