Crystals for shifted key polynomials
Abstract
This article continues our study of - and -key polynomials, which are (non-symmetric) "partial" Schur - and -functions as well as "shifted" versions of key polynomials. Our main results provide a crystal interpretation of - and -key polynomials, namely, as the characters of certain connected subcrystals of normal crystals associated to the queer Lie superalgebra . In the -key case, the ambient normal crystals are the -crystals studied by Grantcharov et al., while in the -key case, these are replaced by the extended -crystals recently introduced by the first author and Tong. Using these constructions, we propose a crystal-theoretic lift of several conjectures about the decomposition of involution Schubert polynomials into - and -key polynomials. We verify these generalized conjectures in a few special cases. Along the way, we establish some miscellaneous results about normal -crystals and Demazure -crystals.
Cite
@article{arxiv.2306.00336,
title = {Crystals for shifted key polynomials},
author = {Eric Marberg and Travis Scrimshaw},
journal= {arXiv preprint arXiv:2306.00336},
year = {2026}
}
Comments
60 pages, 6 figures; v2 minor updates; v3: minor corrections and updated references