AbstractWe show that every limit point of the kth largest eigenvalues of graphs is a limit point of the (k + 1)th largest eigenvalues, and we find out the smallest limit point of the kth largest eigenvalues and an upper bound of the limit points of the kth smallest eigenvalues. For k ≥ 4, we prove that there exists a gap beyond the smallest limit point in which no point is the limit point of the kth largest eigenvalues. For the third largest eigenvalues of a graph G with at least three vertices, we obtain that (1) λ3(G) < −1 iff G ≅ P3; (2) λ3(G) = −1 iff Gc is isomorphic to a complete bipartite graph plus isolated vertices: (3) there exist no graphs such that −1 < λ3(G) < (1 − √5)2. Consequently, if Gc is not a complete bipartite graph plu...
AbstractIn this paper, we identify within connected graphs of order n and size n+k (with 0⩽k⩽4 and n...
AbstractGraphs with second largest eigenvalue λ2⩽1 are extensively studied, however, whether they ar...
AbstractWe determine all trees whose second largest eigenvalue does not exceed 2. Next, we consider ...
AbstractWe show that every limit point of the kth largest eigenvalues of graphs is a limit point of ...
summary:The study on limit points of eigenvalues of undirected graphs was initiated by A. J. Hoffm...
AbstractIf r⩾τ12+τ-12 (τ is the golden mean), then there exists a sequence of graphs whose kth large...
We prove that for each $d \geq 3$ the set of all limit points of the second largest eigenvalue of gr...
AbstractUpper and lower estimates are found for the maximum of the kth eigenvalue of a graph as a fu...
AbstractLet λ1(G)⩾⋯⩾λn(G) be the eigenvalues of a graph G. We explore the distribution of eigenvalue...
AbstractIn this paper we consider graphs with three distinct eigenvalues and, we characterize those ...
AbstractGiven a graph G, let λ (G) denote the largest eigenvalue of the adjacency matrix of G. We pr...
AbstractLet G be a graph on n vertices. Denote by L(G) the Laplacian matrix of G. It is easy to see ...
AbstractIt is well known in the theory of graph spectra that connected graphs except for complete mu...
AbstractIn this paper all connected bipartite graphs whose second largest eigenvalue does not exceed...
AbstractLet λ2 be the second largest eigenvalue of a graph. Powers (1988) [4] gave some upper bounds...
AbstractIn this paper, we identify within connected graphs of order n and size n+k (with 0⩽k⩽4 and n...
AbstractGraphs with second largest eigenvalue λ2⩽1 are extensively studied, however, whether they ar...
AbstractWe determine all trees whose second largest eigenvalue does not exceed 2. Next, we consider ...
AbstractWe show that every limit point of the kth largest eigenvalues of graphs is a limit point of ...
summary:The study on limit points of eigenvalues of undirected graphs was initiated by A. J. Hoffm...
AbstractIf r⩾τ12+τ-12 (τ is the golden mean), then there exists a sequence of graphs whose kth large...
We prove that for each $d \geq 3$ the set of all limit points of the second largest eigenvalue of gr...
AbstractUpper and lower estimates are found for the maximum of the kth eigenvalue of a graph as a fu...
AbstractLet λ1(G)⩾⋯⩾λn(G) be the eigenvalues of a graph G. We explore the distribution of eigenvalue...
AbstractIn this paper we consider graphs with three distinct eigenvalues and, we characterize those ...
AbstractGiven a graph G, let λ (G) denote the largest eigenvalue of the adjacency matrix of G. We pr...
AbstractLet G be a graph on n vertices. Denote by L(G) the Laplacian matrix of G. It is easy to see ...
AbstractIt is well known in the theory of graph spectra that connected graphs except for complete mu...
AbstractIn this paper all connected bipartite graphs whose second largest eigenvalue does not exceed...
AbstractLet λ2 be the second largest eigenvalue of a graph. Powers (1988) [4] gave some upper bounds...
AbstractIn this paper, we identify within connected graphs of order n and size n+k (with 0⩽k⩽4 and n...
AbstractGraphs with second largest eigenvalue λ2⩽1 are extensively studied, however, whether they ar...
AbstractWe determine all trees whose second largest eigenvalue does not exceed 2. Next, we consider ...