Harish-Chandra Theorem for Two-parameter Quantum Groups

Abstract

This paper is devoted to investigating the centre of two-parameter quantum groups Ur,s(g) via establishing the Harish-Chandra homomorphism. Based on the Rosso form and the representation theory of weight modules, we prove that when rank g is even, the Harish-Chandra homomorphism is an isomorphism, and in particular, the centre of the quantum group Ur,s(g) of the weight lattice type is a polynomial algebra K[z_1,·s,z_n], where canonical central elements zλ \; (λ ∈ +) are turned out to be uniformly expressed. For rank g to be odd, we figure out a new invertible extra central generator z*, which doesn't survive in Uq( g), then the centre of Ur,s(g) contains K[z_1,·s,z_n] K K[z*1, z*-1], where =2, except =4 for D2k+1.