Integrable representations of the quantum affine special linear superalgebra (Q346016)

The problem of constructing solutions of the spectral parameters dependent Yang- Baxter equation was converted to the much easier linear problem of solving the \({Z_2}\)-graded Jimbo equations by using the representation theory of quantum supergroups.NEWLINENEWLINEThe \(Z_{2}\)-graded Jimbo equations determine the universal \(R\)-matrix of quantum affine superalgebras in loop representations. A basic problem in studying the equations is to determine which finite dimensional irreducible representation of a quantum supergroup can be lifted to a representation of the corresponding quantum affine superalgebra.NEWLINENEWLINEHaufang Zang gave a classification of the finite dimensional simple modules for \(U_{q} \left ( \tilde{s \ell} \left( M/N \right) \right)\) at generic \(q\). In this paper a generalization of the results of [\textit{S. Eswara Rao}, Proc. Am. Math. Soc. 141, No. 10, 3411--3419 (2013; Zbl 1319.17011); \textit{S. Eswara Rao} and \textit{K. Zhao}, Contemp. Math. 343, 243--261 (2004; Zbl 1048.17004); \textit{Y. Wu} and \textit{R. B. Zhang}, J. Pure Appl. Algebra 220, No. 4, 1434--1450 (2016; Zbl 1334.17008)] on \( \tilde{s \ell} \left( M/N \right) \) to the quantum setting to obtain a classification of the simple integrable modules with finite dimensional weight spaces for \(U_{q} \left ( \tilde{s \ell} \left( M/N \right) \right)\) at generic \(q\). This also extends results on loop modules for quantum \(\tilde{s \ell}(n)\) to that for the quantum affine superalgebra.NEWLINENEWLINEThe main results are given in Theorems \(3.10\), Theorem \(3.11\) and Theorem \(4.2\). The paper consists of four sections and three appendixes and it is interesting in the integrable representations of the affine special linear superalgebra \(U_{q} \left ( \tilde{s \ell} \left( M/N \right) \right)\) at generic \(q\).