On the R-matrix realization of the quantum loop algebra. The case of Uq(D(2)n)
Abstract
The connection between the R-matrix realization and Drinfeld's realization of the quantum loop algebra Uq(D(2)n) is considered using the Gaussian decomposition approach proposed by J. Ding and I. B. Frenkel. Our main result is a description of the embedding Uq(D(2)n-1) Uq(D(2)n) that underlies this connection. Explicit relations between all Gaussian coordinates of the L-operators and the currents are presented.
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