Petals and Books: The largest Laplacian spectral gap from 1

Abstract

We prove that, for any connected graph on N≥ 3 vertices, the spectral gap from the value 1 with respect to the normalized Laplacian is at most 1/2. Moreover, we show that equality is achieved if and only if the graph is either a petal graph (for N odd) or a book graph (for N even). This implies that (12,32) is a maximal gap interval for the normalized Laplacian on connected graphs. This is closely related to the Alon-Boppana bound on regular graphs and a recent result by Koll\'ar and Sarnak on cubic graphs. Our result also provides a sharp bound for the convergence rate of some eigenvalues of the Laplacian on neighborhood graphs.

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