A Poisson Hopf algebra related to a twisted quantum group

Abstract

A Poisson algebra C[G] considered as a Poisson version of the twisted quantized coordinate ring Cq,p[G], constructed by Hodges, Levasseur and Toro in HoLeT, is obtained and its Poisson structure is investigated. This establishes that all Poisson prime and primitive ideals of C[G] are characterized. Further it is shown that C[G] satisfies the Poisson Dixmier-Moeglin equivalence and that Zariski topology on the space of Poisson primitive ideals of C[G] agrees with the quotient topology induced by the natural surjection from the maximal ideal space of C[G] onto the Poisson primitive ideal space.