T. Divyadevi, I. Jeyaraman
Published 2023-09-04Version 1
The eccentricity matrix of a simple connected graph G is obtained from the distance matrix of G by retaining the largest non-zero 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 B (which includes trees) of bi-block graphs. We first find the inertia of the eccentricity matrices of graphs in B, and thereby we characterize graphs in B with odd diameters. Precisely, if G in B with diameter of G greater 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 B are irreducible.
On the spectral radius of bi-block graphs with given independence number $α$
Geodesics in a Graph of Perfect Matchings
The generalized connectivity of complete bipartite graphs
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