A complete characterization of graphs for which mG(-1) = n-d-1

Abstract

Let G be a simple connected graph of order n with diameter d. Let mG(-1) denote the multiplicity of the eigenvalue -1 of the adjacency matrix of G, and let P = Pd+1 be the diameter path of G. If -1 is not an eigenvalue of P, then by the interlacing theorem, we have mG(-1)≤ n - d - 1. In this article, we characterize the extremal graphs where equality holds. Moreover, for the completeness of the results, we also characterize the graphs G that achieve mG(-1) = n - d - 1 when -1 is an eigenvalue of P. Thus, we provide a complete characterization of the graphs G for which mG(-1) = n - d - 1.

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