English

Upper Bounds of Schubert Polynomials

Combinatorics 2020-08-18 v2

Abstract

Let ww be a permutation of {1,2,,n}\{1,2,\ldots,n \}, and let D(w)D(w) be the Rothe diagram of ww. The Schubert polynomial Sw(x)\mathfrak{S}_w(x) can be realized as the dual character of the flagged Weyl module associated to D(w)D(w). This implies a coefficient-wise inequality Minw(x)Sw(x)Maxw(x),\mathrm{Min}_w(x)\leq \mathfrak{S}_w(x)\leq \mathrm{Max}_w(x), where both Minw(x)\mathrm{Min}_w(x) and Maxw(x)\mathrm{Max}_w(x) are polynomials determined by D(w)D(w). Fink, M\'esz\'aros and St.\,Dizier found that Sw(x)\mathfrak{S}_w(x) equals the lower bound Minw(x)\mathrm{Min}_w(x) if and only if ww avoids twelve permutation patterns. In this paper, we show that Sw(x)\mathfrak{S}_w(x) reaches the upper bound Maxw(x)\mathrm{Max}_w(x) if and only if ww avoids two permutation patterns 1432 and 1423. Similarly, for any given composition αZ0n\alpha\in \mathbb{Z}_{\geq 0}^n, one can define a lower bound Minα(x)\mathrm{Min}_\alpha(x) and an upper bound Maxα(x)\mathrm{Max}_\alpha(x) for the key polynomial κα(x)\kappa_\alpha(x). Hodges and Yong established that κα(x)\kappa_{\alpha}(x) equals Minα(x)\mathrm{Min}_\alpha(x) if and only if α\alpha avoids five composition patterns. We show that κα(x)\kappa_{\alpha}(x) equals Maxα(x)\mathrm{Max}_\alpha(x) if and only if α\alpha avoids a single composition pattern (0,2)(0,2). As an application, we obtain that when α\alpha avoids (0,2)(0,2), the key polynomial κα(x)\kappa_{\alpha}(x) is Lorentzian, partially verifying a conjecture of Huh, Matherne, M\'esz\'aros and St.\,Dizier.

Keywords

Cite

@article{arxiv.1909.07206,
  title  = {Upper Bounds of Schubert Polynomials},
  author = {Neil J. Y. Fan and Peter L. Guo},
  journal= {arXiv preprint arXiv:1909.07206},
  year   = {2020}
}

Comments

14 pages, 4 figures

R2 v1 2026-06-23T11:16:39.878Z