Graph identification index
Abstract
We introduce the \emph{ID-index} of a finite simple connected graph. For a graph with diameter , we let assign \emph{ranks} to the vertices, then under , each vertex gets a \emph{string}, which is a -vector with the -th coordinate being the sum of the ranks of the vertices that are of distance from . The \emph{ID-index} of , denoted by , is defined to be the minimum number for which there is an with , such that each vertex gets a distinct string under . We present some relations between ID-graphs, which were defined by Chartrand, Kono, and Zhang, and their ID-indices; give a lower bound on the ID-index of a graph; and determine the ID-indices of paths, grids, cycles, prisms, complete graphs, some complete multipartite graphs, and some caterpillars.
Keywords
Cite
@article{arxiv.2410.07019,
title = {Graph identification index},
author = {Runze Wang},
journal= {arXiv preprint arXiv:2410.07019},
year = {2024}
}