AbstractWe present new criteria for copositivity of a matrix, i.e., conditions which ensure that the quadratic form induced by the matrix is nonnegative over the nonnegative orthant. These criteria arise from the representation of the quadratic form in barycentric coordinates with respect to the standard simplex and simplicial partitions thereof. We show that, as the partition gets finer and finer, the conditions eventually capture all strictly copositive matrices. We propose an algorithmic implementation which considers several numerical aspects. As an application, we present results on the maximum clique problem. We also briefly discuss extensions of our approach to copositivity with respect to arbitrary polyhedral cones
In this report we discuss the set of copositive plus matrices and their properties. We examine certa...
AbstractThe paper explores ways of determining whether a given symmetric matrix is copositive. In pa...
Copositivity tests are presented based on new necessary and sufficient conditions requiring the solu...
AbstractWe present new criteria for copositivity of a matrix, i.e., conditions which ensure that the...
Detection of copositivity plays an important role in combinatorial and quadratic optimization. Recen...
Copositivity plays a role in combinatorial and nonconvex quadratic optimization. However, testing co...
AbstractIn this paper, we present an algorithm of simple exponential growth called COPOMATRIX for de...
AbstractWe present criteria for verifying the copositivity of an n × n matrix, given that all its pr...
AbstractFinding out whether a real symmetric n × n matrix A is not copositive is an NP-complete prob...
Over the last decades, algorithms have been developed for checking copositivity of a matrix. Methods...
Over the last decades checking copositivity of matrices by simplicial subdivision of the unit simple...
In this article, we introduce a new method of certifying any copositive matrix to be copositive. Thi...
AbstractIn recently proposed quadratic optimization algorithms, copositivity detection procedures ar...
A symmetric matrix is called copositive if it generates a quadratic form taking no negative values o...
AbstractAndersson et al. [L.E. Andersson, G. Chang, T. Elfving, Criteria for copositive matrices usi...
In this report we discuss the set of copositive plus matrices and their properties. We examine certa...
AbstractThe paper explores ways of determining whether a given symmetric matrix is copositive. In pa...
Copositivity tests are presented based on new necessary and sufficient conditions requiring the solu...
AbstractWe present new criteria for copositivity of a matrix, i.e., conditions which ensure that the...
Detection of copositivity plays an important role in combinatorial and quadratic optimization. Recen...
Copositivity plays a role in combinatorial and nonconvex quadratic optimization. However, testing co...
AbstractIn this paper, we present an algorithm of simple exponential growth called COPOMATRIX for de...
AbstractWe present criteria for verifying the copositivity of an n × n matrix, given that all its pr...
AbstractFinding out whether a real symmetric n × n matrix A is not copositive is an NP-complete prob...
Over the last decades, algorithms have been developed for checking copositivity of a matrix. Methods...
Over the last decades checking copositivity of matrices by simplicial subdivision of the unit simple...
In this article, we introduce a new method of certifying any copositive matrix to be copositive. Thi...
AbstractIn recently proposed quadratic optimization algorithms, copositivity detection procedures ar...
A symmetric matrix is called copositive if it generates a quadratic form taking no negative values o...
AbstractAndersson et al. [L.E. Andersson, G. Chang, T. Elfving, Criteria for copositive matrices usi...
In this report we discuss the set of copositive plus matrices and their properties. We examine certa...
AbstractThe paper explores ways of determining whether a given symmetric matrix is copositive. In pa...
Copositivity tests are presented based on new necessary and sufficient conditions requiring the solu...