English

Degenerate two-boundary centralizer algebras

Representation Theory 2011-08-31 v4 Combinatorics

Abstract

Diagram algebras (e.g. graded braid groups, Hecke algebras, Brauer algebras) arise as tensor power centralizer algebras, algebras of commuting operators for a Lie algebra action on a tensor space. This work explores centralizers of the action of a complex reductive Lie algebra g\mathfrak{g} on tensor space of the form MNVkM \otimes N \otimes V^{\otimes k}. We define the degenerate two-boundary braid algebra Gk\mathcal{G}_k and show that centralizer algebras contain quotients of this algebra in a general setting. As an example, we study in detail the combinatorics of special cases corresponding to Lie algebras gln\mathfrak{gl}_n and sln\mathfrak{sl}_n and modules MM and NN indexed by rectangular partitions. For this setting, we define the degenerate extended two-boundary Hecke algebra Hkext\mathcal{H}_k^{\mathrm{ext}} as a quotient of Gk\mathcal{G}_k, and show that a quotient of Hkext\mathcal{H}_k^{\mathrm{ext}} is isomorphic to a large subalgebra of the centralizer. We further study the representation theory of Hkext\mathcal{H}_k^{\mathrm{ext}} to find that the seminormal representations are indexed by a known family of partitions. The bases for the resulting modules are given by paths in a lattice of partitions, and the action of Hkext\mathcal{H}_k^{\mathrm{ext}} is given by combinatorial formulas.

Keywords

Cite

@article{arxiv.1007.3950,
  title  = {Degenerate two-boundary centralizer algebras},
  author = {Zajj Daugherty},
  journal= {arXiv preprint arXiv:1007.3950},
  year   = {2011}
}

Comments

45 pages, to appear in Pacific Journal of Mathematics

R2 v1 2026-06-21T15:51:47.355Z