This paper presents an algorithm for finding feasible solutions of linear matrix inequalities. The algorithm is based on the method of alternating projections (MAP), a classical method for solving convex feasibility problems. Unlike MAP, which is an iterative method that converges asymptotically to a feasible point, the algorithm converges after a finite number of steps. The key computational component of the algorithm is an eigenvalue-eigenvector decomposition which is carried out at each iteration. Computational results for the algorithm are presented and comparisons are made with existing algorithms
A new method is introduced for large scale convex constrained optimization. The general model algor...
Many problems of systems control theory boil down to solving polynomial equations, polynomial inequa...
This thesis studies the classical finite pivot methods for solving linear programs and their efficie...
This paper develops a new variant of the classical alternating projection method for solving convex ...
Numerous problems in control and systems theory can be formulated in terms of linear matrix inequali...
Abstract. This paper provides algorithms for numerical solution of convex matrix inequalities in whi...
AbstractAn algorithm is described for finding a feasible point for a system of linear inequalities. ...
AbstractAn algorithm previously introduced by the author for finding a feasible point of a system of...
Let A(x) = A0 + x1A1 + · · · + xnAn be a linear matrix, or pencil, generated by given symmetric m...
AbstractThe solution of linear systems of equations using various projection algorithms is considere...
International audienceThe effectiveness of projection methods for solving systems of linear inequali...
AbstractAn iterative method is proposed for solving convex feasibility problems. Each iteration is a...
International audienceMany iterative methods for solving optimization or feasibility problems have b...
Abstract1Several algorithms are known that solve a system of m linear inequalities in n variables us...
AbstractWe study the solution of consistent, semidefinite and symmetric linear systems by iterative ...
A new method is introduced for large scale convex constrained optimization. The general model algor...
Many problems of systems control theory boil down to solving polynomial equations, polynomial inequa...
This thesis studies the classical finite pivot methods for solving linear programs and their efficie...
This paper develops a new variant of the classical alternating projection method for solving convex ...
Numerous problems in control and systems theory can be formulated in terms of linear matrix inequali...
Abstract. This paper provides algorithms for numerical solution of convex matrix inequalities in whi...
AbstractAn algorithm is described for finding a feasible point for a system of linear inequalities. ...
AbstractAn algorithm previously introduced by the author for finding a feasible point of a system of...
Let A(x) = A0 + x1A1 + · · · + xnAn be a linear matrix, or pencil, generated by given symmetric m...
AbstractThe solution of linear systems of equations using various projection algorithms is considere...
International audienceThe effectiveness of projection methods for solving systems of linear inequali...
AbstractAn iterative method is proposed for solving convex feasibility problems. Each iteration is a...
International audienceMany iterative methods for solving optimization or feasibility problems have b...
Abstract1Several algorithms are known that solve a system of m linear inequalities in n variables us...
AbstractWe study the solution of consistent, semidefinite and symmetric linear systems by iterative ...
A new method is introduced for large scale convex constrained optimization. The general model algor...
Many problems of systems control theory boil down to solving polynomial equations, polynomial inequa...
This thesis studies the classical finite pivot methods for solving linear programs and their efficie...