通过二级和三级规则有理正交矩阵构建余谱图

Lihuan Mao, Fu Yan
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引用次数: 0

摘要

如果两个图 $G$ 和 $H$ 的邻接矩阵具有相同的频谱,那么这两个图就是同谱图。多年来,人们一直在广泛研究共谱非同构图的构造,文献中也有各种已知的构造,例如著名的 GM 切换法。在本文中,我们将通过具有二级和三级的正则有理正交矩阵 $Q$ 来构造共谱图。我们提供了两种直截了当的算法来描述图 $G$ 的邻接矩阵 $A$,从而使 $Q^TAQ$ 又是一个(0,1)矩阵,并引入了两种新的切换方法来构造共谱图族,这在一定程度上概括了 GM 切换法。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Constructing cospectral graphs via regular rational orthogonal matrix with level two and three
Two graphs $G$ and $H$ are \emph{cospectral} if the adjacency matrices share the same spectrum. Constructing cospectral non-isomorphic graphs has been studied extensively for many years and various constructions are known in the literature, e.g. the famous GM-switching method. In this paper, we shall construct cospectral graphs via regular rational orthogonal matrix $Q$ with level two and three. We provide two straightforward algorithms to characterize with adjacency matrix $A$ of graph $G$ such that $Q^TAQ$ is again a (0,1)-matrix, and introduce two new switching methods to construct families of cospectral graphs which generalized the GM-switching to some extent.
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