Hopf Algebras which Factorize through the Taft Algebra Tm2(q) and the Group Hopf Algebra K[Cn]

Abstract

We completely describe by generators and relations and classify all Hopf algebras which factorize through the Taft algebra Tm2(q) and the group Hopf algebra K[Cn]: they are nm2-dimensional quantum groups Tnm2 ω(q) associated to an n-th root of unity ω. Furthermore, using Dirichlet's prime number theorem we are able to count the number of isomorphism types of such Hopf algebras. More precisely, if d = gcd(m,(n)) and (n)d = p1α1 ·s prαr is the prime decomposition of (n)d then the number of types of Hopf algebras that factorize through Tm2(q) and K[Cn] is equal to (α1 + 1)(α2 + 1) ·s (αr + 1), where (n) is the order of the group of n-th roots of unity in K. As a consequence of our approach, the automorphism groups of these Hopf algebras are described as well.