AbstractLet A∈Rn×n. We provide a block characterization of copositive matrices, with the assumption that one of the principal blocks is positive definite. Haynsworth and Hoffman showed that if r is the largest eigenvalue of a copositive matrix then r⩾∣λ∣, for all other eigenvalues λ of A. We continue their study of the spectral theory of copositive matrices and show that a copositive matrix must have a positive vector in the subspace spanned by the eigenvectors corresponding to the nonnegative eigenvalues. Moreover, if a symmetric matrix has a positive vector in the subspace spanned by the eigenvectors corresponding to its nonnegative eigenvalues, then it is possible to increase the nonnegative eigenvalues to form a copositive matrix A′, wi...
AbstractAndersson et al. [L.E. Andersson, G. Chang, T. Elfving, Criteria for copositive matrices usi...
In this paper it is considered how graphs can be used to generate copositive matrices, and necessary...
AbstractThe paper explores ways of determining whether a given symmetric matrix is copositive. In pa...
Checking copositivity of a matrix is a co-NP-complete problem. This paper studies copositive matrice...
Checking copositivity of a matrix is a co-NP-complete problem. This paper studies copositive matrice...
AbstractHaynsworth and Hoffman proved in 1969 that the spectral radius of a symmetric copositive mat...
We say that a symmetric matrix $A$ is copositive if $\mathbf{v}^T A\mathbf{v}\geq0$ for all nonnegat...
AbstractA symmetric matrix C is called copositive if the quadratic form x′Cx is nonnegative for all ...
AbstractLet E be the set of symmetric matrices in which every entry is 0 or ±1 and each diagonal ent...
In this article, we introduce a new method of certifying any copositive matrix to be copositive. Thi...
In this paper we give a first study of perfect copositive $n \times n$matrices. They can be used to ...
AbstractA symmetric matrix C is said to be copositive if its associated quadratic form is nonnegativ...
AbstractThe paper presents necessary and sufficient conditions that a symmetric matrix be copositive...
We call an element A of the n x n copositive cone C-n irreducible with respect to the nonnegative co...
International audienceLet A be an element of the copositive cone C^n. A zero u of A is a nonzero non...
AbstractAndersson et al. [L.E. Andersson, G. Chang, T. Elfving, Criteria for copositive matrices usi...
In this paper it is considered how graphs can be used to generate copositive matrices, and necessary...
AbstractThe paper explores ways of determining whether a given symmetric matrix is copositive. In pa...
Checking copositivity of a matrix is a co-NP-complete problem. This paper studies copositive matrice...
Checking copositivity of a matrix is a co-NP-complete problem. This paper studies copositive matrice...
AbstractHaynsworth and Hoffman proved in 1969 that the spectral radius of a symmetric copositive mat...
We say that a symmetric matrix $A$ is copositive if $\mathbf{v}^T A\mathbf{v}\geq0$ for all nonnegat...
AbstractA symmetric matrix C is called copositive if the quadratic form x′Cx is nonnegative for all ...
AbstractLet E be the set of symmetric matrices in which every entry is 0 or ±1 and each diagonal ent...
In this article, we introduce a new method of certifying any copositive matrix to be copositive. Thi...
In this paper we give a first study of perfect copositive $n \times n$matrices. They can be used to ...
AbstractA symmetric matrix C is said to be copositive if its associated quadratic form is nonnegativ...
AbstractThe paper presents necessary and sufficient conditions that a symmetric matrix be copositive...
We call an element A of the n x n copositive cone C-n irreducible with respect to the nonnegative co...
International audienceLet A be an element of the copositive cone C^n. A zero u of A is a nonzero non...
AbstractAndersson et al. [L.E. Andersson, G. Chang, T. Elfving, Criteria for copositive matrices usi...
In this paper it is considered how graphs can be used to generate copositive matrices, and necessary...
AbstractThe paper explores ways of determining whether a given symmetric matrix is copositive. In pa...