Cocycle deformations for liftings of quantum linear spaces

Abstract

Let A be a Hopf algebra over a field K of characteristic 0 and suppose there is a coalgebra projection π from A to a sub-Hopf algebra H that splits the inclusion. If the projection is H-bilinear, then A is isomorphic to a biproduct R #H where (R,) is called a pre-bialgebra with cocycle in the category HHYD. The cocycle maps R R to H. Examples of this situation include the liftings of pointed Hopf algebras with abelian group of points as classified by Andruskiewitsch and Schneider [AS1]. One asks when such an A can be twisted by a cocycle γ:A A→ K to obtain a Radford biproduct. By results of Masuoka [Ma1, Ma2], and Gr\"unenfelder and Mastnak [GM], this can always be done for the pointed liftings mentioned above. In a previous paper [ABM1], we showed that a natural candidate for a twisting cocycle is λ where λ∈ H is a total integral for H and is as above. We also computed the twisting cocycle explicitly for liftings of a quantum linear plane and found some examples where the twisting cocycle we computed was different from λ . In this note we show that in many cases this cocycle is exactly λ and give some further examples where this is not the case. As well we extend the cocycle computation to quantum linear spaces; there is no restriction on the dimension.