R-matrix realization of two-parameter quantum group Ur,s(gln)

Abstract

We provide a Faddeev-Reshetikhin-Takhtajan's RTT approach to the quantum group Fun(GLr,s(n)) and the quantum enveloping algebra Ur,s(gln) corresponding to the two-parameter R-matrix. We prove that the quantum determinant detr,sT is a quasi-central element in Fun(GLr,s(n)) generalizing earlier results of Dipper-Donkin and Du-Parshall-Wang. The explicit formulation provides an interpretation of the deforming parameters, and the quantized algebra Ur,s(R) is identified to Ur,s(gln) as the dual algebra. We then construct n-1 quasi-central elements in Ur,s(R) which are analogues of higher Casimir elements in Uq(gln).