Even-primitive vectors in induced supermodules for general linear supergroups and in costandard supermodules for Schur superalgebras

Abstract

Let G=GL(m|n) be the general linear supergroup over an algebraically closed field K of characteristic zero and let Gev=GL(m)× GL(n) be its even subsupergroup. The induced supermodule H0G(λ), corresponding to a dominant weight λ of G, can be represented as H0Gev(λ) (Y), where Y=Vm* Vn is a tensor product of the dual of the natural GL(m)-module Vm and the natural GL(n)-module Vn, and (Y) is the exterior algebra of Y. For a dominant weight λ of G, we construct explicit Gev-primitive vectors in H0G(λ). Related to this, we give explicit formulas for Gev-primitive vectors of the supermodules H0Gev(λ) k Y. Finally, we describe a basis of Gev-primitive vectors in the largest polynomial subsupermodule ∇(λ) of H0G(λ) (and therefore in the costandard supermodule of the corresponding Schur superalgebra S(m|n)). This yields a description of a basis of Gev-primitive vectors in arbitrary induced supermodule H0G(λ).