AbstractGraphs with second largest eigenvalue λ2⩽1 are extensively studied, however, whether they are determined by their adjacency spectra or not is less considered. In this paper we completely characterize all the connected bipartite graphs with λ2<1 that are determined by their adjacency spectra. In addition, we prove that all the connected non-bipartite graphs with girth no less than 4 and λ2<1 are determined by their adjacency spectra
AbstractIn this paper, all connected graphs with the fourth largest Laplacian eigenvalue less than t...
AbstractIn this paper we consider graphs with three distinct eigenvalues and, we characterize those ...
AbstractThe largest eigenvalue of the adjacency matrix of a graph has received considerable attentio...
AbstractGraphs with second largest eigenvalue λ2⩽1 are extensively studied, however, whether they ar...
AbstractIn this paper all connected bipartite graphs whose second largest eigenvalue does not exceed...
AbstractWe determine all trees whose second largest eigenvalue does not exceed 2. Next, we consider ...
AbstractIn this paper, all connected bipartite graphs are characterized whose third largest Laplacia...
AbstractConnected graphs in which the number of edges equals the number of vertices plus one are cal...
AbstractThe star complement technique is a spectral tool recently developed for constructing some bi...
AbstractLet λ2 be the second largest eigenvalue of a graph. Powers (1988) [4] gave some upper bounds...
AbstractLet G a simple undirected graph with n ⩾ 2 vertices and let α0(G) ⩾ …, αn−1(G) be the eigenv...
AbstractA generalized θ-graph, denoted by θn, is a graph consisting of n internal disjoint (u, v)-pa...
AbstractWe determine all nested split graphs (i.e. graphs having no induced subgraphs equal to 2K2,P...
AbstractWe continue our investigation of graphs G for which the least eigenvalue λ(G) is minimal amo...
AbstractA graph is said to be determined by the adjacency spectrum (DS for short) if there is no oth...
AbstractIn this paper, all connected graphs with the fourth largest Laplacian eigenvalue less than t...
AbstractIn this paper we consider graphs with three distinct eigenvalues and, we characterize those ...
AbstractThe largest eigenvalue of the adjacency matrix of a graph has received considerable attentio...
AbstractGraphs with second largest eigenvalue λ2⩽1 are extensively studied, however, whether they ar...
AbstractIn this paper all connected bipartite graphs whose second largest eigenvalue does not exceed...
AbstractWe determine all trees whose second largest eigenvalue does not exceed 2. Next, we consider ...
AbstractIn this paper, all connected bipartite graphs are characterized whose third largest Laplacia...
AbstractConnected graphs in which the number of edges equals the number of vertices plus one are cal...
AbstractThe star complement technique is a spectral tool recently developed for constructing some bi...
AbstractLet λ2 be the second largest eigenvalue of a graph. Powers (1988) [4] gave some upper bounds...
AbstractLet G a simple undirected graph with n ⩾ 2 vertices and let α0(G) ⩾ …, αn−1(G) be the eigenv...
AbstractA generalized θ-graph, denoted by θn, is a graph consisting of n internal disjoint (u, v)-pa...
AbstractWe determine all nested split graphs (i.e. graphs having no induced subgraphs equal to 2K2,P...
AbstractWe continue our investigation of graphs G for which the least eigenvalue λ(G) is minimal amo...
AbstractA graph is said to be determined by the adjacency spectrum (DS for short) if there is no oth...
AbstractIn this paper, all connected graphs with the fourth largest Laplacian eigenvalue less than t...
AbstractIn this paper we consider graphs with three distinct eigenvalues and, we characterize those ...
AbstractThe largest eigenvalue of the adjacency matrix of a graph has received considerable attentio...