A Combinatorial Proof of the Unimodality and Symmetry of Weak Composition Rank Sequences

IF 0.6 4区 数学 Q4 MATHEMATICS, APPLIED Annals of Combinatorics Pub Date : 2022-12-11 DOI:10.1007/s00026-022-00624-0
Yueming Zhong
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引用次数: 1

Abstract

A weak composition of an integer s with m parts is a way of writing s as the sum of a sequence of non-negative integers of length m. Given two positive integers m and n, let N(mn) denote the set of all weak compositions \(\alpha =(\alpha _1,\dots ,\alpha _m)\) with \(0 \le \alpha _i \le n\) for \(1 \le i \le m\) and \(c_w^{m,n}(s)\) be the number of weak composition of s into m parts with no part exceeding n. A poset is called a symmetric chain decomposition if the poset can be expressed as a disjoint union of symmetric chains. In this paper, we show that the poset N(mn) can be expressed as a disjoint of symmetric chains by constructive method, which implies that its rank sequence \(c_w^{m,n}(0),c_w^{m,n}(1),\dots ,c_w^{m,n}(mn)\) is unimodal and symmetric.

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弱组合秩序列的单模态与对称性的组合证明
具有m个部分的整数s的弱合成是将s写成长度为m的非负整数序列的和的一种方式。给定两个正整数m和n,设N(m,N)表示所有弱合成的集合\(\alpha=(\alpha _1,\dots,\alpha _m)\),其中\(0\le \alpha _i\le N\)用于\(1\le i\le m\),并且\(c_w^{m,N}(s)\)是s的弱合成为m个部分且不超过N的数量。如果偏序集可以表示为对称链的不相交并集,则称为对称链分解。本文用构造方法证明了偏序集N(m,N)可以表示为对称链的不相交,这意味着它的秩序列(c_w^{m,N}(0),c_w^{m,N}(1),\dots,c_w^{m,N}(mn))是单峰对称的。
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来源期刊
Annals of Combinatorics
Annals of Combinatorics 数学-应用数学
CiteScore
1.00
自引率
0.00%
发文量
56
审稿时长
>12 weeks
期刊介绍: Annals of Combinatorics publishes outstanding contributions to combinatorics with a particular focus on algebraic and analytic combinatorics, as well as the areas of graph and matroid theory. Special regard will be given to new developments and topics of current interest to the community represented by our editorial board. The scope of Annals of Combinatorics is covered by the following three tracks: Algebraic Combinatorics: Enumerative combinatorics, symmetric functions, Schubert calculus / Combinatorial Hopf algebras, cluster algebras, Lie algebras, root systems, Coxeter groups / Discrete geometry, tropical geometry / Discrete dynamical systems / Posets and lattices Analytic and Algorithmic Combinatorics: Asymptotic analysis of counting sequences / Bijective combinatorics / Univariate and multivariable singularity analysis / Combinatorics and differential equations / Resolution of hard combinatorial problems by making essential use of computers / Advanced methods for evaluating counting sequences or combinatorial constants / Complexity and decidability aspects of combinatorial sequences / Combinatorial aspects of the analysis of algorithms Graphs and Matroids: Structural graph theory, graph minors, graph sparsity, decompositions and colorings / Planar graphs and topological graph theory, geometric representations of graphs / Directed graphs, posets / Metric graph theory / Spectral and algebraic graph theory / Random graphs, extremal graph theory / Matroids, oriented matroids, matroid minors / Algorithmic approaches
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