Tensor structure on the Kazhdan-Lusztig category for affine gl(1|1)

Abstract

We show that the Kazhdan-Lusztig category KLk of level-k finite-length modules with highest-weight composition factors for the affine Lie superalgebra gl(1|1) has vertex algebraic braided tensor supercategory structure, and that its full subcategory Okfin of objects with semisimple Cartan subalgebra actions is a tensor subcategory. We show that every simple gl(1|1)-module in KLk has a projective cover in Okfin, and we determine all fusion rules involving simple and projective objects in Okfin. Then using Knizhnik-Zamolodchikov equations, we prove that KLk and Okfin are rigid. As an application of the tensor supercategory structure on Okfin, we study certain module categories for the affine Lie superalgebra sl(2|1) at levels 1 and -12. In particular, we obtain a tensor category of sl(2|1)-modules at level -12 that includes relaxed highest-weight modules and their images under spectral flow.