Add to ORKGAbstract Let A be the adjacency matrix of a graph G, let D be its distance matrix and let V be the diagonal matrix with elements that indicate the valence of corresponding vertices. We explore possibility of discriminating the degree of similarity between isospectral graphs (having the same eigenvalues of the adjacency matrix A) by examining their spectral properties with respect to additional graph matrices: A -V matrix, which is essentially the Laplace matrix multiplied by -1; AA T -V matrix, which is obtained from AA T where elements on the main diagonal are replaced by zeros; natural distance matrix N DD, constructed from distances between columns of the adjacency matrix viewed as vectors in N-dimensional space; terminal matrix, which i...
Spectral graph theory studies the relation between structural properties of a graph and the eigenval...
Spectral graph theory is a captivating area of graph theory that employs the eigenvalues and eigenve...
With every graph (or digraph) one can associate several different matrices. Here we shall concentrat...
AbstractFor almost all graphs the answer to the question in the title is still unknown. Here we surv...
Isospectral molecules are non-identical structures which possess the same spectrum of eigenvalues. M...
Two graphs having the same number of vertices connected in the same way are said to be isomorphic. T...
In [E.R. van Dam and W.H. Haemers, Which graphs are determined by their spectrum?, Linear Algebra Ap...
Numerical graph theoretic invariants or topological indices (TIs) and principal components (PCs) der...
AbstractThe notion of a (1, x) adjacency matrix is introduced, together with methods for dealing wit...
Let $G$ be a connected graph with adjacency matrix $A(G)$. The distance matrix $D(G)$ of $G$ has row...
1-4Three measures of the similarity of the spectra of molecular graphs are considered. Two of them a...
At some time, in the childhood of spectral graph theory, it was conjectured that non-isomorphic gra...
We show that a number of graph invariants are, even combined, insufficient to distinguish between no...
Let G be a connected graph on n vertices. For a vertex u∈G, the eccentricity of u is defined as ε(u)...
Let G be a connected graph on n vertices. For a vertex u∈G, the eccentricity of u is defined as ε(u)...
Spectral graph theory studies the relation between structural properties of a graph and the eigenval...
Spectral graph theory is a captivating area of graph theory that employs the eigenvalues and eigenve...
With every graph (or digraph) one can associate several different matrices. Here we shall concentrat...
AbstractFor almost all graphs the answer to the question in the title is still unknown. Here we surv...
Isospectral molecules are non-identical structures which possess the same spectrum of eigenvalues. M...
Two graphs having the same number of vertices connected in the same way are said to be isomorphic. T...
In [E.R. van Dam and W.H. Haemers, Which graphs are determined by their spectrum?, Linear Algebra Ap...
Numerical graph theoretic invariants or topological indices (TIs) and principal components (PCs) der...
AbstractThe notion of a (1, x) adjacency matrix is introduced, together with methods for dealing wit...
Let $G$ be a connected graph with adjacency matrix $A(G)$. The distance matrix $D(G)$ of $G$ has row...
1-4Three measures of the similarity of the spectra of molecular graphs are considered. Two of them a...
At some time, in the childhood of spectral graph theory, it was conjectured that non-isomorphic gra...
We show that a number of graph invariants are, even combined, insufficient to distinguish between no...
Let G be a connected graph on n vertices. For a vertex u∈G, the eccentricity of u is defined as ε(u)...
Let G be a connected graph on n vertices. For a vertex u∈G, the eccentricity of u is defined as ε(u)...
Spectral graph theory studies the relation between structural properties of a graph and the eigenval...
Spectral graph theory is a captivating area of graph theory that employs the eigenvalues and eigenve...
With every graph (or digraph) one can associate several different matrices. Here we shall concentrat...