On the multiplicity of 1 as a Laplacian eigenvalue of a graph

Abstract

Let G be a graph with p(G) pendant vertices and q(G) quasi-pendant vertices. Denote by mL(G)(λ) the multiplicity of λ as a Laplacian eigenvalue of G. Let G be the reduced graph of G, which can be obtained from G by deleting some pendant vertices such that p(G)=q(G). We first prove that mL(G)(1)=p(G)-q(G)+mL(G)(1). Since deleting pendant path P3 does not change the multiplicity of Laplacian eigenvalue 1 of a graph, we further focus on reduced graphs without pendant path P3. Let T be a reduced tree on n(≥ 6) vertices without pendant path P3, then it is proved that mL(T)(1)≤ n-64, and all the trees attaining the upper bound are characterized completely. As an application, for a reduced unicyclic graph G of order n≥ 10 without pendant path P3, we get mL(G)(1)≤ n4, and all the unicyclic graphs attaining the upper bound are determined completely.