Cleft Extensions and Quotients of Twisted Quantum Doubles

Abstract

Given a pair of finite groups F, G and a normalized 3-cocycle ω of G, where F acts on G as automorphisms, we consider quasi-Hopf algebras defined as a cleft extension Gω\#c\, F where c denotes some suitable cohomological data. When F→ F:=F/A is a quotient of F by a central subgroup A acting trivially on G, we give necessary and sufficient conditions for the existence of a surjection of quasi-Hopf algebras and cleft extensions of the type Gω\#c\, F→ Gω\#c \, F. Our construction is particularly natural when F=G acts on G by conjugation, and Gω\#c G is a twisted quantum double Dω(G). In this case, we give necessary and sufficient conditions that Rep(Gω\#c \, G) is a modular tensor category.