Graph identification index

Abstract

We introduce the ID-index of a finite simple connected graph. For a graph G=(V,\ E) with diameter d, we let f:V R assign ranks to the vertices, then under f, each vertex v gets a string, which is a d-vector with the i-th coordinate being the sum of the ranks of the vertices that are of distance i from v. The ID-index of G, denoted by IDI(G), is defined to be the minimum number k for which there is an f with |f(V)|=k, such that each vertex gets a distinct string under f. 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.

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