Relative Serre functor for comodule algebras

Abstract

Let C be a finite tensor category, and let M be an exact left C-module category. The relative Serre functor of M is an endofunctor S on M together with a natural isomorphism Hom(M, N)* Hom(N, S(M)) for M, N ∈ M, where Hom is the internal Hom functor of M. In this paper, we discuss the case where C and M are the category of modules over a finite-dimensional Hopf algebra H and the category of modules over an H-comodule algebra L, respectively. We give an explicit description of the relative Serre functor of M and its twisted module structure in terms of the Frobenius structure of L. We also study pivotal structures on M and give some concrete examples.