Proof of a conjecture on `plateaux' phenomenon of graph Laplacian eigenvalues

Abstract

Let G be a simple graph. A pendant path of G is a path such that one of its end vertices has degree 1, the other end has degree 3, and all the internal vertices have degree 2. Let pk(G) be the number of pendant paths of length k of G, and qk(G) be the number of vertices with degree 3 which are an end vertex of some pendant paths of length k. Motivated by the problem of characterizing dendritic trees, N. Saito and E. Woei conjectured that any graph G has some Laplacian eigenvalue with multiplicity at least pk(G)-qk(G). We prove a more general result for both Laplacian and signless Laplacian eigenvalues from which the conjecture follows.