The Asymptotic Normality of $(s,s+1)$-Cores with Distinct Parts

János Komlós, Emily Sergel, Gábor Tusnády

Type: Article

Publication Date: 2020-03-19

Citations: 0

DOI: https://doi.org/10.37236/8770

Abstract

Simultaneous core partitions are important objects in algebraic combinatorics. Recently there has been interest in studying the distribution of sizes among all $(s,t)$-cores for coprime $s$ and $t$. Zaleski (2017) gave strong evidence that when we restrict our attention to $(s,s+1)$-cores with distinct parts, the resulting distribution is approximately normal. We prove his conjecture by applying the Combinatorial Central Limit Theorem and mixing the resulting normal distributions.

Locations

The Electronic Journal of Combinatorics - View - PDF
Repository of the Academy's Library (Library of the Hungarian Academy of Sciences) - View - PDF
arXiv (Cornell University) - View - PDF

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Works Cited by This (18)

Action	Title	Year	Authors
+	Partitions which are simultaneously t1- and t2-core	2002	Jaclyn Anderson
+	Explicit Expressions for the Variance and Higher Moments of the Size of a Simultaneous Core Partition and its Limiting Distribution	2015	Shalosh B. Ekhad Doron Zeilberger
+	Probabilistic Bounds on the Coefficients of Polynomials with Only Real Zeros	1997	Jim Pitman
+ PDF Chat	A bijection between dominant Shi regions and core partitions	2010	Susanna Fishel Monica Vazirani
+ PDF Chat	An estimate of the remainder in a combinatorial central limit theorem	1984	Erwin Bolthausen
+ PDF Chat	Stirling Behavior is Asymptotically Normal	1967	L. H. Harper
+	Central and local limit theorems applied to asymptotic enumeration	1973	Edward A. Bender
+	Explicit expressions for the moments of the size of an (s,s+ 1)-core partition with distinct parts	2016	Anthony Zaleski
+ PDF Chat	A bijection between (bounded) dominant Shi regions and core partitions	2010	Susanna Fishel Monica Vazirani
+	On the polynomiality and asymptotics of moments of sizes for random (n, dn ± 1)-core partitions with distinct parts	2019	Huan Xiong Wenston J. T. Zang