Structure of Virasoro tensor categories at central charge 13-6p-6p-1 for integers p > 1

Abstract

Let Oc be the category of finite-length central-charge-c modules for the Virasoro Lie algebra whose composition factors are irreducible quotients of reducible Verma modules. Recently, it has been shown that Oc admits vertex algebraic tensor category structure for any c∈C. Here, we determine the structure of this tensor category when c=13-6p-6p-1 for an integer p>1. For such c, we prove that Oc is rigid, and we construct projective covers of irreducible modules in a natural tensor subcategory Oc0. We then compute all tensor products involving irreducible modules and their projective covers. Using these tensor product formulas, we show that Oc has a semisimplification which, as an abelian category, is the Deligne product of two tensor subcategories that are tensor equivalent to the Kazhdan-Lusztig categories for affine sl2 at levels -2+p 1. Next, as a straightforward consequence of the braided tensor category structure on Oc together with the theory of vertex operator algebra extensions, we rederive known results for triplet vertex operator algebras W(p), including rigidity, fusion rules, and construction of projective covers. Finally, we prove a recent conjecture of Negron that Oc0 is braided tensor equivalent to the PSL(2,C)-equivariantization of the category of W(p)-modules.