On noncommutative equivariant bundles

Abstract

We discuss a possible noncommutative generalization of the notion of an equivariant vector bundle. Let A be a K-algebra, M a left A-module, H a Hopf K-algebra, δ:A H A:=HK A an algebra coaction, and let (H A)δ denote H A with the right A-module structure induced by~δ. The usual definitions of an equivariant vector bundle naturally lead, in the context of K-algebras, to an (H A)-module homomorphism \[:H M (H A)δAM\] that fulfills some appropriate conditions. On the other hand, sometimes an (A,H)-Hopf module is considered instead, for the same purpose. When is invertible, as is always the case when H is commutative, the two descriptions are equivalent. We point out that the two notions differ in general, by giving an example of a noncommutative Hopf algebra H for which there exists such a that is not invertible and a left-right (A,H)-Hopf module whose corresponding homomorphism M H (A H)δAM is not an isomorphism.