AbstractLet G be a finite graph of order n with an eigenvalue μ of multiplicity k. (Thus the μ-eigenspace of a (0,1)-adjacency matrix of G has dimension k.) A star complement for μ in G is an induced subgraph G-X of G such that |X|=k and G-X does not have μ as an eigenvalue. An exceptional graph is a connected graph, other than a generalized line graph, whose eigenvalues lie in [-2,∞). We establish some properties of star complements, and of eigenvectors, of exceptional graphs with least eigenvalue −2
AbstractIn this paper it is shown that, for any odd integer t>3, the line graph L(Kt) is the unique ...
Let G be a finite graph with H as a star complement for an eigenvalue other than 0 or -1. Let κ(G), ...
We determine all the finite regular graphs which have an induced matching or a cocktail party graph ...
Let G be a finite graph of order n with an eigenvalue ? of multiplicity k. (Thus the ?-eigenspace of...
Submitted by W. Haemers Let G be a finite graph of order n with an eigenvalue μ of multiplicity k. (...
AbstractLet μ be an eigenvalue of the graph G with multiplicity k. A star complement for μ in G is a...
AbstractWe survey the main results of the theory of graphs with least eigenvalue −2 starting from la...
AbstractThe star complement technique is a spectral tool recently developed for constructing some bi...
AbstractLet μ be an eigenvalue of the graph G with multiplicity m. A star complement for μ in G is a...
Let G be a finite graph with an eigenvalue μ of multiplicity m. A set X of m vertices in G is called...
Let $G$ be a graph of order $n$ and $\mu$ be an adjacency eigenvalue of $G$ with multiplicity $k\geq...
AbstractWe survey results concerning star complements in finite regular graphs, and note the connect...
Let μ be an eigenvalue of the graph G with multiplicity k. A star set corresponding to μ in G is a s...
Suppose that the positive integer μ is the eigenvalue of largest multiplicity in an extremal stro...
AbstractA graph is said to be exceptional if it is connected, has least eigenvalue greater than or e...
AbstractIn this paper it is shown that, for any odd integer t>3, the line graph L(Kt) is the unique ...
Let G be a finite graph with H as a star complement for an eigenvalue other than 0 or -1. Let κ(G), ...
We determine all the finite regular graphs which have an induced matching or a cocktail party graph ...
Let G be a finite graph of order n with an eigenvalue ? of multiplicity k. (Thus the ?-eigenspace of...
Submitted by W. Haemers Let G be a finite graph of order n with an eigenvalue μ of multiplicity k. (...
AbstractLet μ be an eigenvalue of the graph G with multiplicity k. A star complement for μ in G is a...
AbstractWe survey the main results of the theory of graphs with least eigenvalue −2 starting from la...
AbstractThe star complement technique is a spectral tool recently developed for constructing some bi...
AbstractLet μ be an eigenvalue of the graph G with multiplicity m. A star complement for μ in G is a...
Let G be a finite graph with an eigenvalue μ of multiplicity m. A set X of m vertices in G is called...
Let $G$ be a graph of order $n$ and $\mu$ be an adjacency eigenvalue of $G$ with multiplicity $k\geq...
AbstractWe survey results concerning star complements in finite regular graphs, and note the connect...
Let μ be an eigenvalue of the graph G with multiplicity k. A star set corresponding to μ in G is a s...
Suppose that the positive integer μ is the eigenvalue of largest multiplicity in an extremal stro...
AbstractA graph is said to be exceptional if it is connected, has least eigenvalue greater than or e...
AbstractIn this paper it is shown that, for any odd integer t>3, the line graph L(Kt) is the unique ...
Let G be a finite graph with H as a star complement for an eigenvalue other than 0 or -1. Let κ(G), ...
We determine all the finite regular graphs which have an induced matching or a cocktail party graph ...