Upper Bounds of Schubert Polynomials

Abstract

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