On the semisimplicity of the category KLk for affine Lie superalgebras

Abstract

We study the semisimplicity of the category KLk for affine Lie superalgebras and provide a super analog of certain results from arXiv:1801.09880. Let KLkfin be the subcategory of KLk consisting of ordinary modules on which the Cartan subalgebra acts semisimply. We prove that KLkfin is semisimple when 1) k is a collapsing level, 2) Wk(g, θ) is rational, 3) Wk(g, θ) is semisimple in a certain category. The analysis of the semisimplicity of KLk is subtler than in the Lie algebra case, since in super case KLk can contain indecomposable modules. We are able to prove that in many cases when KLkfin is semisimple we indeed have KLkfin=KLk, which therefore excludes indecomposable and logarithmic modules in KLk. In these cases we are able to prove that there is a conformal embedding W Vk(g) with W semisimple (see Section 10). In particular, we prove the semisimplicity of KLk for g=sl(2 1) and k = -m+1m+2, m ∈ Z 0. For g =sl(m 1), we prove that KLk is semisimple for k=-1, but for k=1 we show that it is not semisimple by constructing indecomposable highest weight modules in KLkfin.