A Quasi-Pentagon Equation for a Heisenberg Double of a Quasi-Hopf Algebra

Abstract

For a finite-dimensional Hopf algebra H, the canonical elements of the Heisenberg doubles H(H) and H(H) satisfy the pentagon and Hopf equations, respectively. In this paper we construct quasi-Hopf analogues of these structures. For a finite-dimensional quasi-Hopf algebra H, we consider natural quasi-Hopf analogues H1(H) and H1(H) of H(H) and H(H). Although their canonical elements are defined just as in the Hopf algebra case, they need not be invertible. We prove that there nevertheless exist natural inverse-like elements. In H1(H), the canonical element satisfies a quasi-pentagon equation and its inverse-like element satisfies a quasi-Hopf equation, while in H1(H) the roles are reversed.