Nakayama functor for monads on finite abelian categories

Abstract

If M is a finite abelian category and T is a linear right exact monad on M, then the category T-mod of T-modules is a finite abelian category. We give an explicit formula of the Nakayama functor of T-mod under the assumption that the underlying functor of the monad T has a double left adjoint and a double right adjoint. As applications, we deduce formulas of the Nakayama functor of the center of a finite bimodule category and the dual of a finite tensor category. Some examples from the Hopf algebra theory are also discussed.