Quasi-quantum groups from strings

Abstract

Motivated by string theory on the orbifold M/G in presence of a Kalb-Ramond field strength H, we define the operators that lift the group action to the twisted sectors. These operators turn out to generate the quasi-quantum group Dω[G], introduced in the context of conformal field theory by R. Dijkgraaf, V. Pasquier and P. Roche, with ω a 3-cocycle determined by a series of cohomological equations in a tricomplex combining de Rham, Cech and group cohomologies. We further illustrate some properties of the quasi-quantum group from a string theoretical point of view.