迭代Plethyms的部分对称性

Pub Date : 2023-05-29 DOI:10.1007/s00026-023-00652-4
Álvaro Gutiérrez, Mercedes H. Rosas
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引用次数: 1

摘要

这项工作强调了在迭代体积系数的大家族中存在部分对称性。所涉及的体积系数来自由一行分区索引的Schur函数的迭代体积的Schur基中的展开。部分对称性是用分区上的对合,即翻转对合来描述的,它推广了普遍存在的\(\omega\)对合。具有这种部分对称性的Schur正对称函数称为翻转对称函数。用\(s_\lambda \)取体积描记的运算保持了翻转对称性,前提是\(\lambda)是两个的分区。迭代体积描记图\(s_2\circs_b\cirs_a\)和\(s_c\cirs_2\circ s_a\\)的显式公式,其中a、b和c\(\ge\)2允许我们证明这两个迭代体积描描记图族是翻转对称的。文章最后给出了一些关于迭代体积系数的翻转对称序列的单峰性和渐近正态性的观察、评论和悬而未决的问题。
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Partial Symmetries of Iterated Plethysms

This work highlights the existence of partial symmetries in large families of iterated plethystic coefficients. The plethystic coefficients involved come from the expansion in the Schur basis of iterated plethysms of Schur functions indexed by one-row partitions.The partial symmetries are described in terms of an involution on partitions, the flip involution, that generalizes the ubiquitous \(\omega \) involution. Schur-positive symmetric functions possessing this partial symmetry are termed flip-symmetric. The operation of taking plethysm with \(s_\lambda \) preserves flip-symmetry, provided that \(\lambda \) is a partition of two. Explicit formulas for the iterated plethysms \(s_2\circ s_b\circ s_a\) and \(s_c\circ s_2\circ s_a\), with ab,  and c \(\ge \) 2 allow us to show that these two families of iterated plethysms are flip-symmetric. The article concludes with some observations, remarks, and open questions on the unimodality and asymptotic normality of certain flip-symmetric sequences of iterated plethystic coefficients.

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