Ribbon categories from ind-exact algebras: simple current case

Abstract

We give criteria for when finitely generated local modules over a commutative algebra A in the ind-completion C of a braided tensor category C inherit the structure of a (rigid, braided, ribbon) tensor category. We then apply this to simple current algebras A = g ∈ Eg, where is a subgroup of invertible objects in C. Using a description of simple A-modules, we verify the required hypotheses for this class of algebras and deduce rigidity, braided, ribbon, and non-degeneracy properties for their finitely generated local modules. As applications, we construct examples of ribbon tensor categories from quantum supergroup categories for unrolled gl(1|1).

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