First fundamental theorems of invariant theory for quantum supergroups

Abstract

Let Uq(g) be the quantum supergroup of glm|n or the modified quantum supergroup of ospm|2n over the field of rational functions in q, and let Vq be the natural module for Uq(g). There exists a unique tensor functor, associated with Vq, from the category of ribbon graphs to the category of finite dimensional representations of Uq(g, which preserves ribbon category structures. We show that this functor is full in the cases g=glm|n or osp2+1|2n. For g=osp2|2n, we show that the space HomUq(g(Vq r, Vq s) is spanned by images of ribbon graphs if r+s< 2(2n+1). The proofs involve an equivalence of module categories for two versions of the quantisation of U(g).