Classifying coalgebra split extensions of Hopf algebras

Abstract

For a given Hopf algebra A we classify all Hopf algebras E that are coalgebra split extensions of A by H4, where H4 is the Sweedler's 4-dimensional Hopf algebra. Equivalently, we classify all crossed products of Hopf algebras A # H4 by computing explicitly two classifying objects: the cohomological 'group' H2 (H4, A) and Crp (H4, A) := the set of types of isomorphisms of all crossed products A # H4. All crossed products A #H4 are described by generators and relations and classified: they are parameterized by the set Z P (A) of all central primitive elements of A. Several examples are worked out in detail: in particular, over a field of characteristic p ≥ 3 an infinite family of non-isomorphic Hopf algebras of dimension 4p is constructed. The groups of automorphisms of these Hopf algebras are also described.