The bicrossed products of H4 and H8
Abstract
Let H4 and H8 be the Sweedler's and Kac-Paljutkin Hopf algebras, respectively. In this paper we prove that any Hopf algebra which factorizes through H8 and H4 (equivalently, any bicrossed product between the Hopf algebras H8 and H4) must be isomorphic to one of the following four Hopf algebras: H8 H4, H32,1, H32,2, H32,3. The set of all matched pair (H8, H4, , ) is explicitly described, and then the associated bicrossed products is given by generators and relations.
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