Laplacian eigenvalues of equivalent cographs

Abstract

Let G and H be equivalent cographs with their reduction RG and RH, and suppose the vertices of RG and RH are labeled by the twin numbers ti of the k twin classes they represent. In this paper, we prove that G and H have at least k + Σi∈ I(ti-1) Laplacian eigenvalues in common, where I is the indices of the twin classes whose types are identical in G and H. This confirms the conjecture proposed by T. Abrishami Abris. We also show that no two nonisomorphic equivalent cographs are L-cospectral.