Further results on the structure of (co)ends in finite tensor categories

Abstract

Let C be a finite tensor category, and let M be an exact left C-module category. The action of C on M induces a functor : C Rex(M), where Rex(M) is the category of k-linear right exact endofunctors on M. Our key observation is that has a right adjoint ra given by the end ra(F) = ∫M ∈ M Hom(M, M). As an application, we establish the following results: (1) We give a description of the composition of the induction functor CM* Z(CM*) and Schauenburg's equivalence Z(CM*) ≈ Z(C). (2) We introduce the space CF(M) of `class functions' of M and initiate the character theory for pivotal module categories. (3) We introduce a filtration for CF(M) and discuss its relation with some ring-theoretic notions, such as the Reynolds ideal and its generalizations. (4) We show that ExtC(1, ra(idM)) is isomorphic to the Hochschild cohomology of M. As an application, we show that the modular group acts projectively on the Hochschild cohomology of a modular tensor category.