Categorified trace for module tensor categories over braided tensor categories

Abstract

Given a braided pivotal category C and a pivotal module tensor category M, we define a functor Tr C: M C, called the associated categorified trace. By a result of Bezrukavnikov, Finkelberg and Ostrik, the functor Tr C comes equipped with natural isomorphisms τx,y:Tr C(x y) Tr C(y x), which we call the traciators. This situation lends itself to a diagramatic calculus of `strings on cylinders', where the traciator corresponds to wrapping a string around the back of a cylinder. We show that Tr C in fact has a much richer graphical calculus in which the tubes are allowed to branch and braid. Given algebra objects A and B, we prove that Tr C(A) and Tr C(A B) are again algebra objects. Moreover, provided certain mild assumptions are satisfied, Tr C(A) and Tr C(A B) are semisimple whenever A and B are semisimple.