N=1 super Virasoro tensor categories
Abstract
We show that the category of C1-cofinite modules for the universal N=1 super Virasoro vertex operator superalgebra S(c,0) at any central charge c is locally finite and admits the vertex algebraic braided tensor category structure of Huang-Lepowsky-Zhang. For central charges cns(t)=152-3(t+t-1) with t, we show that this tensor category is semisimple, rigid, and slightly degenerate, and we determine its fusion rules. For central charge cns(1)=32, we show that this tensor category is rigid and that its simple modules have the same fusion rules as Rep\,osp(1 2), in agreement with earlier fusion rule calculations of Milas. Finally, for the remaining central charges cns(t) with t∈ Q×, we show that the simple S(cns(t),0)-module S2,2 of lowest conformal weight hns2,2(t)=3(t-1)28t is rigid and self-dual, except possibly when t 1 is a negative integer or when cns(t) is the central charge of a rational N=1 superconformal minimal model. As S2,2 is expected to generate the category of C1-cofinite S(cns(t),0)-modules under fusion, rigidity of S2,2 is the first key step to proving rigidity of this category for general t∈Q×.
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