Representations of Quantum Affine General Linear Superalgebras at Arbitrary 01-Sequences
Abstract
In this paper, we investigate finite-dimensional irreducible representations of the quantum affine general linear superalgebra Uq(glm|n,s) for arbitrary 01-sequences s, using the RTT presentation. We systematically construct the RTT presentation for quantum general linear superalgebra Uq(glm|n,s), and derive a PBW basis induced by the action of the braid group, compatible with non-standard parities. We determine the necessary and sufficient conditions for the finite-dimensionality of irreducible representations of Uq(glm|n,s) and extend the results to the affine case via the evaluation homomorphism. Specific cases such as (m,n)=(1,1) demonstrate that all finite-dimensional representations are tensor products of typical evaluation representations. This work extends existing representation frameworks and classification methods to encompass arbitrary 01-sequences, establishing the foundation for subsequent research on representations of quantum affine superalgebras.
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