The Poincaré-extended a b $\mathbf {a}\mathbf {b}$ -index

IF 1 2区数学 Q1 MATHEMATICS

Journal of the London Mathematical Society-Second Series Pub Date : 2024-12-20 DOI:10.1112/jlms.70054

Galen Dorpalen-Barry, Joshua Maglione, Christian Stump

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引用次数: 0

Abstract

Motivated by a conjecture concerning Igusa local zeta functions for intersection posets of hyperplane arrangements, we introduce and study the Poincaré-extended $a b$ -index, which generalizes both the $a b$ -index and the Poincaré polynomial. For posets admitting $R$ -labelings, we give a combinatorial description of the coefficients of the extended $a b$ -index, proving their nonnegativity. In the case of intersection posets of hyperplane arrangements, we prove the above conjecture of the second author and Voll as well as another conjecture of the second author and Kühne. We also define the pullback $a b$ -index, generalizing the $c d$ -index of face posets for oriented matroids. Our results recover, generalize, and unify results from Billera–Ehrenborg–Readdy, Bergeron–Mykytiuk–Sottile–van Willigenburg, Saliola–Thomas, and Ehrenborg. This connection allows us to translate our results into the language of quasisymmetric functions, and — in the special case of symmetric functions — pose a conjecture about Schur positivity. This conjecture was strengthened and proved by Ricky Liu, and the proof appears as an appendix.

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受一个关于超平面排列的交点集合的伊古萨局部zeta函数的猜想的启发，我们引入并研究了波恩卡莱扩展的a b $\mathbf {a}\mathbf {b}$ -指数，它概括了a b $\mathbf {a}\mathbf {b}$ -指数和波恩卡莱多项式。对于允许 R $R$ 标记的正集，我们给出了扩展的 a b $\mathbf {a}\mathbf {b}$ 指数系数的组合描述，并证明了它们的非负性。在超平面排列的交集正集情况下，我们证明了第二作者和沃尔的上述猜想，以及第二作者和库内的另一个猜想。我们还定义了回拉 a b $\mathbf {a}\mathbf {b}$ 索引，概括了定向矩阵的面正集的 c d $\mathbf {c}\mathbf {d}$ 索引。我们的结果恢复、概括并统一了比尔拉-艾伦伯格-雷迪、贝格龙-米基蒂乌克-索蒂莱-范-威利根堡、萨利奥拉-托马斯和艾伦伯格的结果。这种联系使我们能够将我们的结果转化为准对称函数的语言，并在对称函数的特殊情况下，提出了关于舒尔正定性的猜想。这个猜想得到了刘力奇的加强和证明，证明作为附录出现。

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来源期刊

Journal of the London Mathematical Society-Second Series 数学-数学

CiteScore

1.90

自引率

0.00%

发文量

186

审稿时长

6-12 weeks

期刊介绍： The Journal of the London Mathematical Society has been publishing leading research in a broad range of mathematical subject areas since 1926. The Journal welcomes papers on subjects of general interest that represent a significant advance in mathematical knowledge, as well as submissions that are deemed to stimulate new interest and research activity.