English

The quantized walled Brauer algebra and mixed tensor space

Quantum Algebra 2013-03-07 v5 Rings and Algebras

Abstract

In this paper we investigate a multi-parameter deformation Br,sn(a,λ,δ)\mathfrak{B}_{r,s}^n(a,\lambda,\delta) of the walled Brauer algebra which was previously introduced by Leduc (\cite{leduc}). We construct an integral basis of Br,sn(a,λ,δ)\mathfrak{B}_{r,s}^n(a,\lambda,\delta) consisting of oriented tangles which is in bijection with walled Brauer diagrams. Moreover, we study a natural action of Br,sn(q)=Br,sn(q1q,qn,[n]q)\mathfrak{B}_{r,s}^n(q)= \mathfrak{B}_{r,s}^n(q^{-1}-q,q^n,[n]_q) on mixed tensor space and prove that the kernel is free over the ground ring RR of rank independent of RR. As an application, we prove one side of Schur--Weyl duality for mixed tensor space: the image of Br,sn(q)\mathfrak{B}_{r,s}^n(q) in the RR-endomorphism ring of mixed tensor space is, for all choices of RR and the parameter qq, the endomorphism algebra of the action of the (specialized via the Lusztig integral form) quantized enveloping algebra U\mathbf{U} of the general linear Lie algebra gln\mathfrak{gl}_n on mixed tensor space. Thus, the U\mathbf{U}-invariants in the ring of RR-linear endomorphisms of mixed tensor space are generated by the action of Br,sn(q)\mathfrak{B}_{r,s}^n(q).

Keywords

Cite

@article{arxiv.0806.0264,
  title  = {The quantized walled Brauer algebra and mixed tensor space},
  author = {R. Dipper and S. Doty and F. Stoll},
  journal= {arXiv preprint arXiv:0806.0264},
  year   = {2013}
}

Comments

34 pages

R2 v1 2026-06-21T10:46:30.097Z