Hopf-Ore Extensions and Hopf Algebras of Rank One

Abstract

In this paper, we study pointed rank one Hopf algebras and Hopf-Ore extensions of group algebras, over an arbitrary field k. It is proved that the rank of a Hopf-Ore extension of a group algebra is one or two or infinite. It is also shown that an arbitrary (finite or infinite dimensional) pointed Hopf algebra of rank one is isomorphic to a quotient of a Hopf-Ore extension of its coradical, a group algebra. We classify the finite dimensional simple modules and describe a family of indecomposable modules over a Hopf-Ore extension H=kG(, a,δ) and its quotient H' of rank one, where (a)≠ 1, G is an abelian group and k is an algebraically closed field. The decomposition of the tensor products of two finite dimensional simple modules into a direct sum of indecomposable modules is given too. We also determine all simple objects and a family of indecomposable projective objects in the categories of all weight modules over H and H'.