Pattern bounds for principal specializations of β-Grothendieck Polynomials

Abstract

There has been recent interest in lower bounds for the principal specializations of Schubert polynomials w := Sw(1,…,1). We prove a conjecture of Yibo Gao in the setting of 1243-avoiding permutations that gives a lower bound for w in terms of the permutation patterns contained in w. We extended this result to principal specializations of β-Grothendieck polynomials (β)w := G(β)w(1,…,1) by restricting to the class of vexillary 1243-avoiding permutations. Our methods are bijective, offering a combinatorial interpretation of the coefficients cw and c(β)w appearing in these conjectures.