On the Eccentricity Matrices of Certain Bi-Block Graphs

IF 1 3区 数学 Q1 MATHEMATICS
T. Divyadevi, I. Jeyaraman
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引用次数: 0

Abstract

The eccentricity matrix of a simple connected graph G is obtained from the distance matrix of G by retaining the largest nonzero distance in each row and column, and the remaining entries are defined to be zero. A bi-block graph is a simple connected graph whose blocks are all complete bipartite graphs with possibly different orders. In this paper, we study the eccentricity matrices of a subclass \({\mathscr {B}}\) (which includes trees) of bi-block graphs. We first find the inertia of the eccentricity matrices of graphs in \({\mathscr {B}}\), and thereby, we characterize graphs in \({\mathscr {B}}\) with odd diameters. Precisely, if the diameter of \(G\in {\mathscr {B}}\) is more than three, then we show that the eigenvalues of the eccentricity matrix of G are symmetric with respect to the origin if and only if the diameter of G is odd. Further, we prove that the eccentricity matrices of graphs in \({\mathscr {B}}\) are irreducible.

论某些双块图的偏心矩阵
简单连通图 G 的偏心矩阵由 G 的距离矩阵求得,保留每行和每列中最大的非零距离,其余项定义为零。双块图是一个简单连通图,它的块都是可能具有不同阶的完整双块图。本文研究双块图的一个子类 \({\mathscr {B}}\) (包括树)的偏心矩阵。我们首先找到了 \({\mathscr {B}}\) 中图形偏心矩阵的惯性,从而确定了 \({\mathscr {B}}\) 中直径为奇数的图形的特征。准确地说,如果 \(G\in {\mathscr {B}}\) 的直径大于 3,那么我们将证明,只有当 G 的直径为奇数时,G 的偏心矩阵的特征值才相对于原点对称。此外,我们还证明了 \({\mathscr {B}}\) 中图形的偏心矩阵是不可还原的。
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来源期刊
CiteScore
2.40
自引率
8.30%
发文量
176
审稿时长
3 months
期刊介绍: This journal publishes original research articles and expository survey articles in all branches of mathematics. Recent issues have included articles on such topics as Spectral synthesis for the operator space projective tensor product of C*-algebras; Topological structures on LA-semigroups; Implicit iteration methods for variational inequalities in Banach spaces; and The Quarter-Sweep Geometric Mean method for solving second kind linear fredholm integral equations.
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