Degenerate two-boundary centralizer algebras
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 on tensor space of the form . We define the degenerate two-boundary braid algebra 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 and and modules and indexed by rectangular partitions. For this setting, we define the degenerate extended two-boundary Hecke algebra as a quotient of , and show that a quotient of is isomorphic to a large subalgebra of the centralizer. We further study the representation theory of 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 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