Generalized Symmetries From Fusion Actions

Abstract

Let A be a condensable algebra in a modular tensor category C. We define an action of the fusion category CA of A-modules in C on the morphism space HomC(x,A) for any x in C, whose characters are generalized Frobenius-Schur indicators. This fusion action can be considered on A, and we prove a categorical generalization of the Schur-Weyl duality for this action. For any fusion subcategory B of CA containing all the local A-modules, we prove the invariant subobject B=AB is a condensable subalgebra of A. The assignment of B to AB defines a Galois correspondence between this kind of fusion subcategories of CA and the condensable subalgebras of A. In the context of VOAs, we prove for any nice VOAs U ⊂ A, U=ACA where C=MU is the category of U-modules. In particular, if U = AG for some finite automorphism group G of A, the fusion action of CA on A is equivalent to the G-action on A.