Duplicial functors, descent categories and generalized Hopf modules

Abstract

B\"ohm and Stefan have expressed cyclic homology as an invariant that assigns homology groups HCi( N, M) to right and left coalgebras N respectively M over a distributive law between two comonads. For the key example associated to a bialgebra H, right -coalgebras have a description in terms of modules and comodules over H. The present article formulates conditions under which such a description is simultaneously possible for the left -coalgebras. In the above example, this is the case when the bialgebra H is a Hopf algebra with bijective antipode. We also discuss how the generalized Hopf module theorem by Mesablishvili and Wisbauer features both in theory and examples.