Homomorphisms and rigid isomorphisms of twisted group doubles

Abstract

We prove several results concerning quasi-bialgebra morphisms Dω(G)η(H) of twisted group doubles. We take a particular focus on the isomorphisms which are simultaneously isomorphisms D(G)(H). All such isomorphisms are shown to be morphisms of quasi-Hopf algebras, and a classification of all such isomorphisms is determined. Whenever ω∈ Z3(G/Z(G),U(1)) this suffices to completely describe Aut(Dω(G)), the group of quasi-Hopf algebra isomorphisms of Dω(G), and so generalizes existing descriptions for the case where ω is trivial.