Graded representations of current Lie superalgebras sl(1|2)[t]
Abstract
This paper is the study of finite-dimensional graded representations of current lie superalgebras sl(1|2)[t]. We define the notion of super POPs, a combinatorial tool to provide another parametrization of the basis of the local Weyl module given in [2]. We derive the graded character formula of local Weyl module for sl(1|2)[t]. Furthermore, we construct a short exact sequence of Chari-Venkatesh modules for sl(1|2)[t]. As a consequence, we prove that Chari-Venkatesh modules are isomorphic to the fusion of generalized Kac modules.
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