Gluing vertex algebras

Abstract

We relate commutative algebras in braided tensor categories to braid-reversed tensor equivalences, motivated by vertex algebra representation theory. First, for C a braided tensor category, we give a detailed construction of the canonical algebra in Crev: if C is semisimple but not necessarily finite or rigid, then X∈Irr(C)X' X is a commutative algebra, with X' a representing object for HomC(CX,1C). Conversely, let A=i∈ IUi Vi be a simple commutative algebra in U with U semisimple and rigid but not necessarily finite, and V rigid but not necessarily semisimple. If the unit objects of U and V form a commuting pair in A, we show there is a braid-reversed equivalence between subcategories of U and V sending Ui to Vi*. When U and V are module categories for simple vertex operator algebras U and V, we glue U and V along U via a map τ:Irr(U)→Obj(V) such that τ(U)=V to create A=X∈Irr(U)X'τ(X). Thus under certain conditions, τ extends to a braid-reversed equivalence between U and V if and only if A is a simple conformal vertex algebra extending U V. As examples, we glue Kazhdan-Lusztig categories at generic levels to obtain new vertex algebras extending the tensor product of two affine vertex algebras, and we prove braid-reversed equivalences between certain module categories for affine vertex algebras and W-algebras at admissible levels.