Representation Crossed Category of Group-cograded Multiplier Hopf Algebras

Abstract

Let A=p∈ GAp be a multiplier Hopf T-coalgebra over a group G, in this paper we give the definition of the crossed left A-G-modules and show that the category of crossed left A-G-modules is a monoidal category. Finally we show that a family of multipliers R = \Rp, q ∈ M(Ap Aq)\p, q∈ G is a quasitriangular structure of a multiplier T-coalgebra A if and only if the crossed left A-G-module category over A is a braided monoidal category with the braiding c defined by R, generalizing the main results in ZCL11 to the more general framework of multiplier Hopf algebras.