完全解决了循环螺母图的有序度存在性问题

IF 0.6 3区 数学 Q3 MATHEMATICS
Ivan Damnjanović
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引用次数: 3

摘要

循环坚果图是一种非平凡的简单图,它的邻接矩阵是一个循环矩阵,它的零空间是由一个没有零元素的向量张成的。关于这些图表,order-degree存在问题的数学问题可以被认为是确定所有可能的双(n, d),存在一个d-regular n循环螺母图。这个问题是由英航š我ć等人,获得的第一个主要结果Damnjanović和Stevanović,谁证明等每一个奇怪的t≥3 t≢10 1和t≢18 15,存在一个4 t-regular循环螺母图每个连的n n≥4 t + 4。随后,damnjanoviki改进了这些结果,证明了当t为奇数,n为偶数,且n≥4t + 4成立时,或者当t为偶数时,n满足n≡4.2,且n≥4t + 6成立时,必然存在一个n阶的4t正则循环坚果图。本文通过完全解决循环螺母图的序度存在性问题,推广了上述结果。换句话说,我们完全确定了存在一个n阶的d规则循环螺母图的所有可能对(n, d)。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Complete resolution of the circulant nut graph order–degree existence problem
A circulant nut graph is a non-trivial simple graph such that its adjacency matrix is a circulant matrix whose null space is spanned by a single vector without zero elements. Regarding these graphs, the order–degree existence problem can be thought of as the mathematical problem of determining all the possible pairs (n, d) for which there exists a d-regular circulant nut graph of order n. This problem was initiated by Bašić et al. and the first major results were obtained by Damnjanović and Stevanović, who proved that for each odd t ≥ 3 such that t ≢10 1 and t ≢18 15, there exists a 4t-regular circulant nut graph of order n for each even n ≥ 4t + 4. Afterwards, Damnjanović improved these results by showing that there necessarily exists a 4t-regular circulant nut graph of order n whenever t is odd, n is even, and n ≥ 4t + 4 holds, or whenever t is even, n is such that n ≡4 2, and n ≥ 4t + 6 holds. In this paper, we extend the aforementioned results by completely resolving the circulant nut graph order–degree existence problem. In other words, we fully determine all the possible pairs (n, d) for which there exists a d-regular circulant nut graph of order n.
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来源期刊
Ars Mathematica Contemporanea
Ars Mathematica Contemporanea MATHEMATICS, APPLIED-MATHEMATICS
CiteScore
1.70
自引率
0.00%
发文量
45
审稿时长
>12 weeks
期刊介绍: Ars mathematica contemporanea will publish high-quality articles in contemporary mathematics that arise from the discrete and concrete mathematics paradigm. It will favor themes that combine at least two different fields of mathematics. In particular, we welcome papers intersecting discrete mathematics with other branches of mathematics, such as algebra, geometry, topology, theoretical computer science, and combinatorics. The name of the journal was chosen carefully. Symmetry is certainly a theme that is quite welcome to the journal, as it is through symmetry that mathematics comes closest to art.
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