AbstractLet λ1 be the greatest eigenvalue and λn the least eigenvalue of the adjacency matrix of a connected graph G with n vertices, m edges and diameter D. We prove that if G is nonregular, thenΔ−λ1>nΔ−2mn(D(nΔ−2m)+1)⩾1n(D+1), where Δ is the maximum degree of G.The inequality improves previous bounds of Stevanović and of Zhang. It also implies that a lower bound on λn obtained by Alon and Sudakov for (possibly regular) connected nonbipartite graphs also holds for connected nonregular graphs
AbstractFor a complex matrix A, the well-known Lévy–Desplanques theorem states that A is nonsingular...
AbstractLet G be a Kr+1-free graph with n vertices and m edges, and let λn(G) be the smallest eigenv...
AbstractLet G be a graph of sufficiently large order n, and let the largest eigenvalue μ(G) of its a...
AbstractWe study the spectral radius of connected non-regular graphs. Let λ1(n,Δ) be the maximum spe...
AbstractLet G=(V,E) be a simple connected graph and λ1(G) be the largest Laplacian eigenvalue of G. ...
AbstractWe improve some recent results on graph eigenvalues. In particular, we prove that if G is a ...
AbstractLet λ1 be the largest eigenvalue and λn the least eigenvalue of the adjacency matrix of a co...
AbstractWe prove three results about the spectral radius μ(G) of a graph G:(a)Let Tr(n) be the r-par...
AbstractAnswering some questions of Gutman, we show that, except for four specific trees, every conn...
AbstractLet G be a simple connected graph with n vertices. The largest eigenvalue of the Laplacian m...
AbstractIn this paper, we investigate the ratio of any two components of a maximal eigenvector of a ...
AbstractGiven a graph G, write μ(G) for the largest eigenvalue of its adjacency matrix, ω(G) for its...
AbstractWe show that if μj is the jth largest Laplacian eigenvalue, and dj is the jth largest degree...
AbstractLet λ1(G) denote the largest eigenvalue of the adjacency matrix and let μ1(G) denote the lar...
AbstractLet G be a graph with n vertices and m edges and let μ(G)=μ1(G)⩾⋯⩾μn(G) be the eigenvalues o...
AbstractFor a complex matrix A, the well-known Lévy–Desplanques theorem states that A is nonsingular...
AbstractLet G be a Kr+1-free graph with n vertices and m edges, and let λn(G) be the smallest eigenv...
AbstractLet G be a graph of sufficiently large order n, and let the largest eigenvalue μ(G) of its a...
AbstractWe study the spectral radius of connected non-regular graphs. Let λ1(n,Δ) be the maximum spe...
AbstractLet G=(V,E) be a simple connected graph and λ1(G) be the largest Laplacian eigenvalue of G. ...
AbstractWe improve some recent results on graph eigenvalues. In particular, we prove that if G is a ...
AbstractLet λ1 be the largest eigenvalue and λn the least eigenvalue of the adjacency matrix of a co...
AbstractWe prove three results about the spectral radius μ(G) of a graph G:(a)Let Tr(n) be the r-par...
AbstractAnswering some questions of Gutman, we show that, except for four specific trees, every conn...
AbstractLet G be a simple connected graph with n vertices. The largest eigenvalue of the Laplacian m...
AbstractIn this paper, we investigate the ratio of any two components of a maximal eigenvector of a ...
AbstractGiven a graph G, write μ(G) for the largest eigenvalue of its adjacency matrix, ω(G) for its...
AbstractWe show that if μj is the jth largest Laplacian eigenvalue, and dj is the jth largest degree...
AbstractLet λ1(G) denote the largest eigenvalue of the adjacency matrix and let μ1(G) denote the lar...
AbstractLet G be a graph with n vertices and m edges and let μ(G)=μ1(G)⩾⋯⩾μn(G) be the eigenvalues o...
AbstractFor a complex matrix A, the well-known Lévy–Desplanques theorem states that A is nonsingular...
AbstractLet G be a Kr+1-free graph with n vertices and m edges, and let λn(G) be the smallest eigenv...
AbstractLet G be a graph of sufficiently large order n, and let the largest eigenvalue μ(G) of its a...