Classification of graphs by Laplacian eigenvalue distribution and independence number

Abstract

Let mGI denote the number of Laplacian eigenvalues of a graph G in an interval I and let α(G) denote the independence number of G. In this paper, we determine the classes of graphs that satisfy the condition mG[0,n-α(G)]=α(G) when α(G)= 2 and α(G)= n-2, where n is the order of G. When α(G)=2, G K1 ∇ Kn-m ∇ Km-1 for some m ≥ 2. When α(G)=n-2, there are two types of graphs B(p,q,r) and B'(p,q,r) of order n=p+q+r+2, which we call the binary star graphs. Also, we show that the binary star graphs with p=r are determined by their Laplacian spectra.