AbstractHaynsworth and Hoffman proved in 1969 that the spectral radius of a symmetric copositive matrix is an eigenvalue of this matrix. This note investigates conditions which guarantee that an eigenvector corresponding to this dominant eigenvalue has no negative coordinates, i.e., whether the Perron–Frobenius property holds. Also a block copositivity criterion using the Schur complement is specified which may be helpful to reduce dimension in copositivity checks and which generalizes results proposed by Andersson et al. in 1995, and Johnson and Reams in 2005. Apparently, the latter five researchers were unaware of the more general results by the author precedingly published in 1987 and 1996, respectively
In this paper, it is proved that a symmetric tensor is (strictly) copositive if and only if each of ...
AbstractSome finite criteria for copositive, copositive-plus, and strictly copositive matrices are p...
The spectral radius of a matrixAis the maximum norm of alleigenvalues ofA. In previous work we alrea...
AbstractHaynsworth and Hoffman proved in 1969 that the spectral radius of a symmetric copositive mat...
AbstractLet A∈Rn×n. We provide a block characterization of copositive matrices, with the assumption ...
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...
We say that a symmetric matrix $A$ is copositive if $\mathbf{v}^T A\mathbf{v}\geq0$ for all nonnegat...
AbstractUpper and lower bounds for the ratio between the spectral radius of a product of nonnegative...
In this article, we introduce a new method of certifying any copositive matrix to be copositive. Thi...
AbstractAndersson et al. [L.E. Andersson, G. Chang, T. Elfving, Criteria for copositive matrices usi...
AbstractWe present criteria for verifying the copositivity of an n × n matrix, given that all its pr...
AbstractA criterion for copositive matrices is given and for n = 3 the set of all copositive matrice...
AbstractThe paper presents necessary and sufficient conditions that a symmetric matrix be copositive...
AbstractLet E be the set of symmetric matrices in which every entry is 0 or ±1 and each diagonal ent...
In this paper, it is proved that a symmetric tensor is (strictly) copositive if and only if each of ...
AbstractSome finite criteria for copositive, copositive-plus, and strictly copositive matrices are p...
The spectral radius of a matrixAis the maximum norm of alleigenvalues ofA. In previous work we alrea...
AbstractHaynsworth and Hoffman proved in 1969 that the spectral radius of a symmetric copositive mat...
AbstractLet A∈Rn×n. We provide a block characterization of copositive matrices, with the assumption ...
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...
We say that a symmetric matrix $A$ is copositive if $\mathbf{v}^T A\mathbf{v}\geq0$ for all nonnegat...
AbstractUpper and lower bounds for the ratio between the spectral radius of a product of nonnegative...
In this article, we introduce a new method of certifying any copositive matrix to be copositive. Thi...
AbstractAndersson et al. [L.E. Andersson, G. Chang, T. Elfving, Criteria for copositive matrices usi...
AbstractWe present criteria for verifying the copositivity of an n × n matrix, given that all its pr...
AbstractA criterion for copositive matrices is given and for n = 3 the set of all copositive matrice...
AbstractThe paper presents necessary and sufficient conditions that a symmetric matrix be copositive...
AbstractLet E be the set of symmetric matrices in which every entry is 0 or ±1 and each diagonal ent...
In this paper, it is proved that a symmetric tensor is (strictly) copositive if and only if each of ...
AbstractSome finite criteria for copositive, copositive-plus, and strictly copositive matrices are p...
The spectral radius of a matrixAis the maximum norm of alleigenvalues ofA. In previous work we alrea...