Gaussian Asymptotics of Jack Measures on Partitions from Weighted Enumeration of Ribbon Paths

Alexander Moll
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引用次数: 5

Abstract

In this paper we determine two asymptotic results for Jack measures on partitions, a model defined by two specializations of Jack polynomials proposed by Borodin-Olshanski in [European J. Combin. 26.6 (2005): 795-834]. Assuming these two specializations are the same, we derive limit shapes and Gaussian fluctuations for the anisotropic profiles of these random partitions in three asymptotic regimes associated to diverging, fixed, and vanishing values of the Jack parameter. To do so, we introduce a generalization of Motzkin paths we call "ribbon paths", show for general Jack measures that certain joint cumulants are weighted sums of connected ribbon paths on $n$ sites with $n-1+g$ pairings, and derive our two results from the contributions of $(n,g)=(1,0)$ and $(2,0)$, respectively. Our analysis makes use of Nazarov-Sklyanin's spectral theory for Jack polynomials. As a consequence, we give new proofs of several results for Schur measures, Plancherel measures, and Jack-Plancherel measures. In addition, we relate our weighted sums of ribbon paths to the weighted sums of ribbon graphs of maps on non-oriented real surfaces recently introduced by Chapuy-Dol\k{e}ga.
带状路径加权枚举分区上Jack测度的高斯渐近性
本文确定了由Borodin-Olshanski在[European J. Combin. 26.6(2005): 795-834]中提出的Jack多项式的两个专门化所定义的分区上的Jack测度的两个渐近结果。假设这两种专门化是相同的,我们在与Jack参数的发散值、固定值和消失值相关的三个渐近区域中推导出这些随机分区的各向异性剖面的极限形状和高斯波动。为此,我们引入了莫兹金路径的一种推广,我们称之为“带状路径”,表明对于一般的Jack测度,某些联合累积量是$n$位置上具有$n-1+g$配对的连接带状路径的加权和,并分别从$(n,g)=(1,0)$和$(2,0)$的贡献中得出我们的两个结果。我们的分析使用了纳扎罗夫-斯克里亚宁的杰克多项式谱理论。因此,我们对Schur测度、Plancherel测度和Jack-Plancherel测度的几个结果给出了新的证明。此外,我们将带状路径的加权和与最近由chapy - dol \k{e}ga引入的非定向真实曲面上映射的带状图的加权和联系起来。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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