Partial Representations of Hopf Algebras

Abstract

In this work, the notion of partial representation of a Hopf algebra is introduced and its relationship with partial actions of Hopf algebras is explored. Given a Hopf algebra H, one can associate it to a Hopf algebroid Hpar which has the universal property that each partial representation of H can be factorized by an algebra morphism from Hpar. We define also the category of partial modules over a Hopf algebra H, which is the category of modules over its associated Hopf algebroid Hpar. The Hopf algebroid structure of Hpar enables us to enhance the category of partial H modules with a monoidal structure and such that the algebra objects in this category are the usual partial actions. Some examples of categories of partial H modules are explored. In particular we can describe fully the category of partially Z2-graded modules.