Commutative algebras in Grothendieck-Verdier categories, rigidity, and vertex operator algebras

Abstract

Let A be a commutative algebra in a braided monoidal category C; e.g., A could be an extension of a vertex operator algebra (VOA) V in a category C of V-modules. We study when the category CA of A-modules in C and its subcategory CAloc of local modules inherit rigidity from C, and then we find conditions for C and CA to inherit rigidity from CAloc. First, we assume C is a braided finite tensor category and prove rigidity of CA and CAloc under conditions based on criteria of Etingof-Ostrik for A to be an exact algebra in C. As a corollary, we show that if A is a simple Z≥ 0-graded VOA with a strongly rational vertex operator subalgebra V, then A is strongly rational, without requiring the categorical dimension of A as a V-module to be non-zero. Next, we assume C is a Grothendieck-Verdier category, i.e., C admits a weaker duality structure than rigidity. We first prove CA is also a Grothendieck-Verdier category. Using this, we prove that if CAloc is rigid, then so is C under conditions such as a mild non-degeneracy assumption on C, an assumption that every simple object of CA is local, and that induction from C to CA commutes with duality. These conditions are motivated by free field-like VOA extensions V⊂eq A where A is often an indecomposable V-module, so our result will make it more feasible to prove rigidity for many vertex algebraic monoidal categories. In a follow-up work, our result will be used to prove rigidity of the category of weight modules for the simple affine VOA of sl2 at any admissible level.