DOIAbstract
AbstractProperties of zero polyhedral cones are studied by making use of Fourier-Motzkin eliminations. Algorithms are presented for the characterization of zero polyhedral cones
AbstractProperties of zero polyhedral cones are studied by making use of Fourier-Motzkin eliminations. Algorithms are presented for the characterization of zero polyhedral cones
We consider linear optimization problems over the cone of copositive matrices. Such conic optimizati...
The cone of real positive definite symmetric matrices with prescribed zeros plays an important role ...
AbstractThis paper concerns the cone of positive semidefinite matrices which have zeros in prescribe...
AbstractProperties of zero polyhedral cones are studied by making use of Fourier-Motzkin elimination...
AbstractWe show that a polyhedral cone Γ in Rn with apex at 0 can be brought to the first quadrant b...
In this article we define an algebraic vertex of a generalized polyhedron and show that the set of a...
In this thesis, we propose a new method for removing all the redundant inequalities generated by Fou...
AbstractSome results are obtained relating topological properties of polyhedral cones to algebraic p...
Let $A$ be an element of the copositive cone $coposn$. A zero $vu$ of $A$ is a nonnegative vector wh...
AbstractIn a paper Cheung, Cucker and Peña (in press) [5] that can be seen as the first part of this...
AbstractThis paper establishes sufficient conditions for asymptotic stability of linear-time-varying...
AbstractGiven a solid polyhedral convex cone K⊂(Rn, positively invariant under the differential syst...
AbstractThe principal pivoting scheme for quadratic programming is used to derive finite criteria fo...
This paper deals with linear systems containing finitely many weak and/or strict inequalities, whose...
AbstractThe positive matrix factorization problem is for a given positive matrix to determine those ...
We consider linear optimization problems over the cone of copositive matrices. Such conic optimizati...
The cone of real positive definite symmetric matrices with prescribed zeros plays an important role ...
AbstractThis paper concerns the cone of positive semidefinite matrices which have zeros in prescribe...
AbstractProperties of zero polyhedral cones are studied by making use of Fourier-Motzkin elimination...
AbstractWe show that a polyhedral cone Γ in Rn with apex at 0 can be brought to the first quadrant b...
In this article we define an algebraic vertex of a generalized polyhedron and show that the set of a...
In this thesis, we propose a new method for removing all the redundant inequalities generated by Fou...
AbstractSome results are obtained relating topological properties of polyhedral cones to algebraic p...
Let $A$ be an element of the copositive cone $coposn$. A zero $vu$ of $A$ is a nonnegative vector wh...
AbstractIn a paper Cheung, Cucker and Peña (in press) [5] that can be seen as the first part of this...
AbstractThis paper establishes sufficient conditions for asymptotic stability of linear-time-varying...
AbstractGiven a solid polyhedral convex cone K⊂(Rn, positively invariant under the differential syst...
AbstractThe principal pivoting scheme for quadratic programming is used to derive finite criteria fo...
This paper deals with linear systems containing finitely many weak and/or strict inequalities, whose...
AbstractThe positive matrix factorization problem is for a given positive matrix to determine those ...
We consider linear optimization problems over the cone of copositive matrices. Such conic optimizati...
The cone of real positive definite symmetric matrices with prescribed zeros plays an important role ...
AbstractThis paper concerns the cone of positive semidefinite matrices which have zeros in prescribe...
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