The relationship between the negative inertia index of graph G and its girth g and diameter d
Abstract
Let G be a simple connected graph. We use n(G), p(G), and η(G) to denote the number of negative eigenvalues, positive eigenvalues, and zero eigenvalues of the adjacency matrix A(G) of G, respectively. In this paper, we prove that 2n(G)≥ d(G) + 1 when d(G) is odd, and n(G) ≥ g2 - 1 for a graph containing cycles, where d(G) and g are the diameter and girth of the graph G, respectively. Furthermore, we characterize the extremal graphs for the cases of 2n(G) = d(G) + 1, n(G) = g2, and n(G) = g2 - 1.
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