Universal tensor categories generated by dual pairs

Abstract

Let V* V→C be a non-degenerate pairing of countable-dimensional complex vector spaces V and V*. The Mackey Lie algebra g=glM(V,V*) corresponding to this paring consists of all endomorphisms of V for which the space V* is stable under the dual endomorphism *: V*→ V*. We study the tensor Grothendieck category T generated by the g-modules V, V* and their algebraic duals V* and V**. This is an analogue of categories considered in prior literature, the main difference being that the trivial module C is no longer injective in T. We describe the injective hull I of C in T, and show that the category T is Koszul. In addition, we prove that I is endowed with a natural structure of commutative algebra. We then define another category IT of objects in T which are free as I-modules. Our main result is that the category IT is also Koszul, and moreover that IT is universal among abelian C-linear tensor categories generated by two objects X, Y with fixed subobjects X' X, Y' Y and a pairing X Y→ 1 where 1 is the monoidal unit. We conclude the paper by discussing the orthogonal and symplectic analogues of the categories T and IT.