Topological semiinfinite tensor (super)modules

Abstract

We construct universal monoidal categories of topological tensor supermodules over the Lie superalgebras gl(V V) and osp(V V) associated with a Tate space V. Here V V is a Z/2Z-graded topological vector space whose even and odd parts are isomorphic to V. We discuss the purely even case first, by introducing monoidal categoriesTgl(V), To(V) and Tsp(V), and show that these categories are anti-equivalent to respective previously studied categories Tgl(V), To(V), Tsp(V). These latter categories have certain universality properties as monoidal categories, which consequently carry over to Tgl(V), To(V) and Tsp(V). Moreover, the categories To(V) and Tsp(V) are known to be equivalent, and this implies the equivalence of the categories To(V) and Tsp(V). After introducing a supersymmetric setting, we establish the equivalence of the category Tgl(V) with the category Tgl(V V), and the equivalence of both categories To(V) and Tsp(V) with Tosp(V V).