Provides an explicit correspondence between Drinfeld current and FRT RLL presentations of the two-parameter quantum affine algebra U_{r,s}(C_n^{(1)}).
The Ding-Frenkel Isomorphism Theorem for two-parameter quantum affine algebra $U_{r,s}\mathcal(\widehat{\mathfrak{so}_{2n+1}})$
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abstract
From the theory of finite-dimensional weight modules, we get the basic braided $R$-matrix $\widehat R$ of $U_{r, s}(\mathfrak{so}_{2n+1})$. For its FRT presentation $U(\widehat R)$, we achieve two word-formation methods of quantum Lyndon bases (whose bracketing rules are regulated by the $RLL$-formalism) and elucidate their distribution rule within the triangular $L$-matrix. Consequently, we contribute an algebraic proof for establishing an isomorphism between the Drinfeld-Jimbo presentation and the FRT presentation. In the affine setting, we first derive two spectral parameter-dependent $R$-matrices through the Yang-Baxterization. Next, we select the only one that satisfies the intertwining property with respect to the minimal affinization. Accordingly, we obtain the $RLL$ realization of $U_{r, s}(\widehat{\mathfrak{so}_{2n+1}})$ through the Gauss decompositions of the generating matrices. Finally, we contribute an algebraic proof to the Ding-Frenkel Isomorphism Theorem between the Drinfeld realization and the $RLL$ realization.
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Algebraic proof of the Ding-Frenkel isomorphism theorem for the two-parameter quantum affine algebra U_{r,s}(widehat{so_{2n+1}}).
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$RLL$-realization of two-parameter quantum affine algebra in type $C_n^{(1)}$
Provides an explicit correspondence between Drinfeld current and FRT RLL presentations of the two-parameter quantum affine algebra U_{r,s}(C_n^{(1)}).
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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}}).