On the R-matrix realization of quantum loop algebras

Abstract

We consider R-matrix realization of the quantum deformations of the loop algebras g corresponding to non-exceptional affine Lie algebras of type g=A(1)N-1, B(1)n, C(1)n, D(1)n, A(2)N-1. For each Uq(g) we investigate the commutation relations between Gauss coordinates of the fundamental L-operators using embedding of the smaller algebra into bigger one. The new realization of these algebras in terms of the currents is given. The relations between all off-diagonal Gauss coordinates and certain projections from the ordered products of the currents are presented. These relations are important in applications to the quantum integrable models.

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