The Schur-Weyl duality and Invariants for classical Lie superalgebras
Abstract
In this article, we provide a comprehensive characterization of invariants of classical Lie superalgebras from the super-analog of the Schur-Weyl duality in a unified way. We establish g-invariants of the tensor algebra T(g), the supersymmetric algebra S(g), and the universal enveloping algebra U(g) of a classical Lie superalgebra g corresponding to every element in centralizer algebras and their relationship under supersymmetrization. As a byproduct, we prove that the restriction on T(g)g of the projection from T(g) to U(g) is surjective, which enables us to determine the generators of the center Z(g) except for g=osp2m|2n. Additionally, we present an alternative algebraic proof of the triviality of Z(pn). The key ingredient involves a technique lemma related to the symmetric group and Brauer diagrams.
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