On graphs with distance Laplacian eigenvalues of multiplicity n-4

Abstract

Let G be a connected simple graph with n vertices. The distance Laplacian matrix DL(G) is defined as DL(G)=Diag(Tr)-D(G), where Diag(Tr) is the diagonal matrix of vertex transmissions and D(G) is the distance matrix of G. The eigenvalues of DL(G) are the distance Laplacian eigenvalues of G and are denoted by ∂1L(G)≥ ∂2L(G)≥ … ≥ ∂nL(G). The largest eigenvalue ∂1L(G) is called the distance Laplacian spectral radius. Lu et al. (2017), Fernandes et al. (2018) and Ma et al. (2018) completely characterized the graphs having some distance Laplacian eigenvalue of multiplicity n-3. In this paper, we characterize the graphs having distance Laplacian spectral radius of multiplicity n-4 together with one of the distance Laplacian eigenvalue as n of multiplicity either 3 or 2. Further, we completely determine the graphs for which the distance Laplacian eigenvalue n is of multiplicity n-4.