A combinatorial 𝔰𝔩₂-action and the Sperner property for the weak order

Abstract: We construct a simple combinatorially-defined representation of s l 2 \mathfrak {sl}_2 which respects the order structure of the weak order on the symmetric group. This is used to prove that the weak order has the strong Sperner property, and is therefore a Peck poset, solving a problem raised by Björner [Orderings of Coxeter groups, Amer. Math. Soc., Providence, RI, 1984, pp. 175–195]; a positive answer to this question had been conjectured by Stanle… Show more

“…The weak order is defined by an equation similar to (1), but with the reflection length R replaced by the more classical length , which records the shortest decomposition of an element of W as a product of simple reflections. The strong Sperner property for the weak order in type A n was previously established by the authors [6]. Another related order, the (strong) Bruhat order, is known to be strongly Sperner for all Coxeter groups by work of Stanley [17].…”

“…By Equation (6) and the classical result that the coefficients of a real-rooted real polynomial are log-concave, we may apply Theorem 2.5 to see that Abs(W ) admits a normalized flow (with ν ≡ 1), implying that it is strongly Sperner.…”

On the Sperner property for the absolute order on complex reflection groups

“…The weak order is defined by an equation similar to (1), but with the reflection length R replaced by the more classical length , which records the shortest decomposition of an element of W as a product of simple reflections. The strong Sperner property for the weak order in type A n was previously established by the authors [6]. Another related order, the (strong) Bruhat order, is known to be strongly Sperner for all Coxeter groups by work of Stanley [17].…”

“…By Equation (6) and the classical result that the coefficients of a real-rooted real polynomial are log-concave, we may apply Theorem 2.5 to see that Abs(W ) admits a normalized flow (with ν ≡ 1), implying that it is strongly Sperner.…”

On the Sperner property for the absolute order on complex reflection groups

“…where [e, π] R denotes the interval below π in the right weak order. The operator F is the restriction of an operator suggested by Stanley [16] and E is a significant generalization of the operator used in [4]. Let e, f, h denote the standard generators for the Lie algebra sl 2 (C) (see Section 2).…”

“…Establishing the Sperner property for the weak order on a parabolic quotient would thus be a strengthening of Theorem 1.1. Björner [1] asked whether the weak order on the whole symmetric group had the (strong) Sperner property; it was conjectured by Stanley [16] that it does, and this was proven in [4] by establishing a certain action of the Lie algebra which respects the weak order. This technique was developed further in [3, 5, 6] in order to establish new formulas for principal evaluations of Schubert polynomials.…”

The Sperner property for 132‐avoiding intervals in the weak order

“…Recently, C. Gaetz and Y. Gao [GG18] proved the invertibility of Stanley's matrix by constructing an action of the Lie algebra sl 2 . We give a new proof of invertibility by proving Stanley's determinant conjecture.…”

Derivatives of Schubert polynomials and proof of a determinant conjecture of Stanley