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Symmetry in Combinatorics and Discrete Mathematics

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Dear Colleagues,

Many interesting symmetric properties appear in combinatorial numbers, including binomial coefficients, Stirling numbers and Bernoulli numbers. Such symmetric identities can be interpreted and studied from combinatorial, arithmetical, geometrical or analytical aspects. This Special Issue will present articles exploring new interpretations, applications and symmetrical and asymmetrical relations in combinatorics and discrete mathematics.

Prof. Dr. Takao Komatsu
Guest Editor

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Keywords

infinite or finite groups
semigroups
designs and configurations
enumerative combinatorics
determinants and permanents
combinatorial sequences

Published Papers (4 papers)

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Research

Jump to: Review

17 pages, 284 KiB

Open AccessArticle

A Note on Incomplete Fibonacci–Lucas Relations

by Jingyang Zhong, Jialing Yao and Chan-Liang Chung

Symmetry 2023, 15(12), 2113; https://doi.org/10.3390/sym15122113 - 24 Nov 2023

Viewed by 660

Abstract

We define the incomplete generalized bivariate Fibonacci p-polynomials and the incomplete generalized bivariate Lucas p-polynomials. We study their recursive relations and derive an interesting relationship through their generating functions. Subsequently, we prove an incomplete version of the well-known Fibonacci–Lucas relation and make some extensions to the relation involving incomplete generalized bivariate Fibonacci and Lucas p-polynomials. An argument about going from the regular to the incomplete Fibonacci–Lucas relation is discussed. We provide a relation involving the incomplete Leonardo and the incomplete Lucas–Leonardo p-numbers as an illustration. Full article

(This article belongs to the Special Issue Symmetry in Combinatorics and Discrete Mathematics)

11 pages, 299 KiB

Open AccessArticle

More Variations on Shuffle Squares

by Jarosław Grytczuk, Bartłomiej Pawlik and Mariusz Pleszczyński

Symmetry 2023, 15(11), 1982; https://doi.org/10.3390/sym15111982 - 26 Oct 2023

Viewed by 691

Abstract

We study an abstract variant of squares (and shuffle squares) defined by a constraint graph G, specifying which pairs of words form a square. So, a shuffle G-square is a word that can be split into two disjoint subwords U and W (of the same length), which are joined by an edge. This setting generalizes a recently introduced model of shuffle squares based on word symmetry and permutations. By using the probabilistic method, we provide a sufficient condition for a constraint graph G guaranteeing the avoidability of shuffle G-squares. By a more-elementary method (known as Rosenfeld counting), we prove that G-squares are avoidable over an alphabet of size

4 α

α > 1

, provided that the degree of every word of length n in G is at most

α^{n}

. We also introduce the concept of the cutting distance between words and state several conjectures involving this notion and various kinds of shuffle squares. We suspect that, for every

k ⩾ 2

, there is a constant

c_{k}

such that every even word can be turned into a shuffle square by cutting it in at most

c_{k}

places and rearranging the resulting pieces. We present some computational, as well as theoretical evidence in favor of this conjecture. Full article

(This article belongs to the Special Issue Symmetry in Combinatorics and Discrete Mathematics)

17 pages, 312 KiB

Open AccessArticle

The p-Numerical Semigroup of the Triple of Arithmetic Progressions

by Takao Komatsu and Haotian Ying

Symmetry 2023, 15(7), 1328; https://doi.org/10.3390/sym15071328 - 29 Jun 2023

Cited by 3 | Viewed by 604

Abstract

For given positive integers

a_{1}, a_{2}, \dots, a_{k}

with

gcd (a_{1}, a_{2}, \dots, a_{k}) = 1

, the denumerant [...] Read more.

For given positive integers

a_{1}, a_{2}, \dots, a_{k}

with

gcd (a_{1}, a_{2}, \dots, a_{k}) = 1

, the denumerant

d (n) = d (n; a_{1}, a_{2}, \dots, a_{k})

is the number of nonnegative solutions

(x_{1}, x_{2}, \dots, x_{k})

of the linear equation

a_{1} x_{1} + a_{2} x_{2} + \dots + a_{k} x_{k} = n

for a positive integer n. For a given nonnegative integer p, let

S_{p} = S_{p} (a_{1}, a_{2}, \dots, a_{k})

be the set of all nonnegative integer n’s such that

d (n) > p

. In this paper, by introducing the p-numerical semigroup, where the set

N_{0} \ S_{p}

is finite, we give explicit formulas of the p-Frobenius number, which is the maximum of the set

N_{0} \ S_{p}

, and related values for the triple of arithmetic progressions. The main aim is to determine the elements of the p-Apéry set. Full article

(This article belongs to the Special Issue Symmetry in Combinatorics and Discrete Mathematics)

Review

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29 pages, 396 KiB

Open AccessReview

Reciprocal Symmetry via Inverse Series Pairs

by Wenchang Chu

Symmetry 2023, 15(5), 1086; https://doi.org/10.3390/sym15051086 - 15 May 2023

Viewed by 1024

Abstract

Reciprocal series are employed to systematically review convolution sums, orthogonality relations, recurrence relations and reciprocal formulae for several classical number sequences, such as binomial coefficients, Stirling numbers, Bernoulli numbers, and Euler numbers. Full article

(This article belongs to the Special Issue Symmetry in Combinatorics and Discrete Mathematics)

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