Module category and C2-cofiniteness of affine vertex operator superalgebras
Abstract
In this paper, we investigate the Lie algebra structures of weight one subspaces of C2-cofinite vertex operator superalgebras. We also show that for any positive integer k, vertex operator superalgebras Lsl(1|n+1)(k,0) and Losp(2|2n)(k,0) have infinitely many irreducible admissible modules. As a consequence, we give a proof of the fact that L g(k,0) is C2-cofinite if and only if g is either a simple Lie algebra, or g=osp(1|2n), and k is a nonnegative integer. As an application, we show that LG(3)(1,0) is a vertex operator superalgebra such that the category of LG(3)(1,0)-modules is semisimple but LG(3)(1,0) is not C2-cofinite.
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