Mixed Schur-Weyl-Sergeev duality for queer Lie superalgebras

Abstract

We introduce a new family of superalgebras Br,s for r, s 0 such that r+s>0, which we call the walled Brauer superalgebras, and prove the mixed Scur-Weyl-Sergeev duality for queer Lie superalgebras. More precisely, let q(n) be the queer Lie superalgebra, V =Cn|n the natural representation of q(n) and W the dual of V. We prove that, if n r+s, the superalgebra Br,s is isomorphic to the supercentralizer algebra q(n)( V r W s) of the q(n)-action on the mixed tensor space V r W s. As an ingredient for the proof of our main result, we construct a new diagrammatic realization Dk of the Sergeev superalgebra Serk. Finally, we give a presentation of Br,s in terms of generators and relations.