A Tensor Category Construction of the Wp,q Triplet Vertex Operator Algebra and Applications

Abstract

For coprime p,q∈Z≥ 2, the triplet vertex operator algebra Wp,q is a non-simple extension of the universal Virasoro vertex operator algebra of central charge cp,q=1-6(p-q)2pq, and it is a basic example of a vertex operator algebra appearing in logarithmic conformal field theory. Here, we give a new construction of Wp,q different from the original screening operator definition of Feigin-Gainutdinov-Semikhatov-Tipunin. Using our earlier work on the tensor category structure of modules for the Virasoro algebra at central charge cp,q, we show that the simple modules appearing in the decomposition of Wp,q as a module for the Virasoro algebra have PSL2-fusion rules and generate a symmetric tensor category equivalent to RepPSL2. Then we use the theory of commutative algebras in braided tensor categories to construct Wp,q as an appropriate non-simple modification of the canonical algebra in the Deligne tensor product of RepPSL2 with this Virasoro subcategory. As a consequence, we show that the automorphism group of Wp,q is PSL2(C). We also define a braided tensor category Ocp,q0 consisting of modules for the Virasoro algebra at central charge cp,q that induce to untwisted modules of Wp,q. We show that Ocp,q0 tensor embeds into the PSL2(C)-equivariantization of the category of Wp,q-modules and is closed under contragredient modules. We conjecture that Ocp,q0 has enough projective objects and is the correct category of Virasoro modules for constructing logarithmic minimal models in conformal field theory.