Algebraic proof of the Ding-Frenkel isomorphism theorem for the two-parameter quantum affine algebra U_{r,s}(widehat{so_{2n+1}}).
Generating Functions with $\tau$-Invariance and Vertex Representations of Quantum Affine Algebras $U_{r,s}(\widehat{\mathfrak{g}})$ (I): Simply-laced Cases
1 Pith paper cite this work. Polarity classification is still indexing.
abstract
We put forward the exact version of two-parameter generating functions with $\tau$-invariance, which allows us to give a unified and inherent definition for the Drinfeld realization of two-parameter quantum affine algebras for all the untwisted types. As verification, we first construct their level-one vertex representations of $U_{r,s}(\widehat{\mathfrak{g}})$ for simply-laced types, which in turn well-detect the effectiveness of our definitions both for $(r,s)$-generating functions and $(r,s)$-Drinfeld realization in the framework of establishing the two-parameter vertex representation theory.
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The Ding-Frenkel Isomorphism Theorem for two-parameter quantum affine algebra $U_{r,s}\mathcal(\widehat{\mathfrak{so}_{2n+1}})$
Algebraic proof of the Ding-Frenkel isomorphism theorem for the two-parameter quantum affine algebra U_{r,s}(widehat{so_{2n+1}}).