Two Equivalent Realizations of Trigonometric Dynamical Affine Quantum Group Uq,x(sl2)=Uq,λ(sl2), Drinfeld Currents and Hopf Algebroid Structures

Abstract

Two new realizations, denoted Uq,x(gl2) and U(Rq,x(gl2)) of the trigonometric dynamical quantum affine algebra Uq,λ(gl2) are proposed, based on Drinfeld-currents and RLL relations respectively, along with a Heisenberg algebra \P,Q\, with x=q2P. Here P plays the role of the dynamical variable λ and Q=∂∂ P. An explicit isomorphism from Uq,x(gl2) to U(Rq,x(gl2)) is established, which is a dynamical extension of the Ding-Frenkel isomorphism of Uq(gl2) with U(Rq(gl2)) between the Drinfeld realization and the Reshetikhin-Tian-Shanksy construction of quantum affine algebras. Hopf algebroid structures and an affine dynamical determinant element are introduced and it is shown that Uq,x(sl2) is isomorphic to U(Rq,x(sl2)). The dynamical construction is based on the degeneration of the elliptic quantum algebra Uq,p(sl2) of Jimbo, Konno et al. as the elliptic variable p 0.