Gelfand $W$-graphs for classical Weyl groups
Abstract
A Gelfand model for an algebra is a module given by a direct sum of irreducible submodules, with every isomorphism class of irreducible modules represented exactly once. We introduce the notion of a perfect model for a finite Coxeter group, which is a certain set of discrete data (involving Rains and Vazirani's concept of a perfect involution) that parametrizes a Gelfand model for the associated Iwahori-Hecke algebra. We describe perfect models for all classical Weyl groups, excluding type D in even rank. The representations attached to these models simultaneously generalize constructions of Adin, Postnikov, and Roichman (from type A to other classical types) and of Araujo and Bratten (from group algebras to Iwahori-Hecke algebras). We show that each Gelfand model derived from a perfect model has a canonical basis that gives rise to a pair of related -graphs, which we call Gelfand -graphs. For types BC and D, we prove that these -graphs are dual to each other, a phenomenon which does not occur in type A.
Cite
@article{arxiv.2012.13868,
title = {Gelfand $W$-graphs for classical Weyl groups},
author = {Eric Marberg and Yifeng Zhang},
journal= {arXiv preprint arXiv:2012.13868},
year = {2022}
}
Comments
35 pages, 5 figures; v2: minor corrections, a few additional references, several new figures