Generalized Kac-Paljutkin algebras

Abstract

In this note, we construct a family of semisimple Hopf algebras Hn,m of dimension nm m! over a field of characteristic zero containing a primitive nth root of unity, where n, m ≥ 2 are integers. The well-known eight-dimensional Kac--Paljutkin algebra arises as the special case H2,2, while the Hopf algebras previously constructed by Pansera correspond to the instances Hn,2. Each algebra Hn,m is defined as an extension of the group algebra K Σm of the symmetric group by the m-fold tensor product R = K Zn m, where Zn denotes the cyclic group of order n. This extension admits a realization as a crossed product: Hn,m = K Zn m \#γΣm. In the final section, we construct a family of irreducible m-dimensional representations of Hn,m that are inner faithful as R-modules and exhibit a nontrivial inner-faithful action of a subalgebra of Hn,m on a quantum polynomial algebra.