Fusion and (non)-rigidity of Virasoro Kac modules in logarithmic minimal models at (p,q)-central charge

Abstract

Let Oc be the category of finite-length modules for the Virasoro Lie algebra at central charge c whose composition factors are irreducible quotients of reducible Verma modules. For any c∈C, this category admits the vertex algebraic braided tensor category structure of Huang, Lepowsky, and Zhang. Here, we begin the detailed study of Ocp,q where cp,q = 1-6(p-q)2pq for relatively prime integers p, q ≥ 2; in conformal field theory, Ocp,q corresponds to a logarithmic extension of the central charge cp,q Virasoro minimal model. We particularly focus on the Virasoro Kac modules Kr,s, r,s∈Z≥ 1, in Ocp,q defined by Morin-Duchesne, Rasmussen, and Ridout, which are finitely-generated submodules of Feigin-Fuchs modules for the Virasoro algebra. We prove that Kr,s is rigid and self-dual when 1≤ r≤ p and 1≤ s≤ q, but that not all Kr,s are rigid when r>p or s>q. That is, Ocp,q is not a rigid tensor category. We also show that all Kac modules and all simple modules in Ocp,q are homomorphic images of repeated tensor products of K1,2 and K2,1, and we determine completely how K1,2 and K2,1 tensor with Kac modules and simple modules in Ocp,q. In the process, we prove some fusion rule conjectures of Morin-Duchesne, Rasmussen, and Ridout.