Combinatorial aspects of the linkage principle for general linear supergroups
Abstract
Let G=GL(m|n) be a general linear supergroup and Gev be its even subsupergroup isomorphic to GL(m)× GL(n). In this paper we use the explicit description of Gev-primitive vectors in the costandard supermodule ∇(λ), the largest polynomial G-subsupermodule of the induced supermodule H0G(λ), for (m|n)-hook partition λ, and a properties of certain morphisms k to derive results related to the odd linkage for G over a field F of characteristic different from 2.
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