Four-angle Hopf modules for Hom-Hopf algebras

Abstract

In this paper, we introduce the notion of a four-angle Hopf module for a Hom-Hopf algebra (H,β) and show that the category \!HHMHH of four-angle Hopf modules is a monoidal category with either a Hom-tensor product H or a Hom-cotensor product H as a monoidal product. We study the category YDHH of Yetter-Drinfel'd modules with bijective structure map can be organized as a braided monoidal category, in which we use a new monoidal structure. Finally, We prove an equivalence between the monoidal category (~\!HHMHH,H) or (~\!HHMHH,H) of four-angle Hopf modules, and the monoidal category YDHH of Yetter-Drinfel'd modules, and furthermore, we give a braiding structure of the monoidal categorys (~\!HHMHH,H) (and (~\!HHMHH,H)).