Characterisation of all integral circulant graphs with multiplicative divisor sets and few eigenvalues

Pub Date : 2023-09-22 DOI:10.1007/s10801-023-01259-x
J. W. Sander, T. Sander
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引用次数: 1

Abstract

Abstract We present a method which in principal allows to characterise all integral circulant graphs with multiplicative divisor set having a spectrum, i.e. the set of distinct eigenvalues, of any given size. We shall exemplify the method for spectra of up to four eigenvalues, also reproving some known results for three eigenvalues along the way. In particular we show that given any integral circulant graph of arbitrary order n with multiplicative divisor set and precisely four distinct eigenvalues, n necessarily is either a prime power or the product of two prime powers with explicitly given simply structured divisor set and set of eigenvalues in both cases.
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具有乘式除数集和少量特征值的所有积分循环图的刻画
摘要本文提出了一种方法,该方法原则上允许描述所有具有谱的具有不同特征值集的整数循环图,即任意给定大小的谱。我们将举例说明最多四个特征值的谱的方法,同时也改进了一些已知的三个特征值的结果。特别地,我们证明了给定任意阶n的整数循环图,它具有相乘的除数集和恰好四个不同的特征值,在这两种情况下,n必然是一个素数幂或两个素数幂的乘积,具有显式给出的简单结构除数集和特征值集。
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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