The multiplicity of the Laplacian eigenvalue 2 in some bicyclic graphs

Abstract

The Laplacian matrix of a graph G is denoted by L(G)=D(G)-A(G), where D(G)=diag(d(v1),… , d(vn)) is a diagonal matrix and A(G) is the adjacency matrix of G. Let G1 and G2 be two graphs. A one-edge connection of two graphs G1 and G2 is a graph G=G1uv G2 with V(G)=V(G1) V(G2) and E(G)= E(G1) E(G2) \e=uv\, where u∈ V(G1) and v∈ V(G2). We investigate the multiplicity of the Laplacian eigenvalue 2 of G1uv G2, while the unicyclic graphs G1 and G2 have 2 among their Laplacian eigenvalues, by using their Laplacian characteristic polynomials. Some structural conditions ensuring the presence of the existence 2 in the G=G1uv G2 where both G1 and G2 have 2 as Laplacian eigenvalue, have been investigated, while, here we study the existence Laplacian eigenvalue 2 in G=G1uv G2 where at most one of G1 or G2 has 2 as Laplacian eigenvalue.