Maximizing the Edelman–Greene statistic

IF 0.4 Q4 MATHEMATICS, APPLIED Journal of Combinatorics Pub Date : 2019-08-29 DOI:10.4310/joc.2023.v14.n2.a1

Gidon Orelowitz

引用次数: 0

Abstract

The $\textit{Edelman-Greene statistic}$ of S. Billey-B. Pawlowski measures the "shortness" of the Schur expansion of a Stanley symmetric function. We show that the maximum value of this statistic on permutations of Coxeter length $n$ is the number of involutions in the symmetric group $S_n$, and explicitly describe the permutations that attain this maximum. Our proof confirms a recent conjecture of C. Monical, B. Pankow, and A. Yong: we give an explicit combinatorial injection between a certain collections of Edelman-Greene tableaux and standard Young tableaux.

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最大化Edelman-Greene统计量

S. billey的$\textit{Edelman-Greene statistic}$。Pawlowski测量了Stanley对称函数的Schur展开的“短度”。我们证明了这个统计量在cox长度$n$的排列上的最大值是对称群$S_n$中的对合数，并明确地描述了达到这个最大值的排列。我们的证明证实了C. Monical, B. Pankow和a . Yong最近的一个猜想:我们在Edelman-Greene的某些集合和标准Young的集合之间给出了一个明确的组合注入。

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Journal of Combinatorics MATHEMATICS, APPLIED-

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