A wide variety of problems in global optimization, combinatorial optimization as well as systems and control theory can be solved by using linear and semidefinite programming. Sometimes, due to the use of floating point arithmetic in combination with ill-conditioning and degeneracy, erroneous results may be produced. The purpose of this article is to show how rigorous error bounds for the optimal value can be computed by carefully postprocessing the output of a linear or semidefinite programming solver. It turns out that in many cases the computational costs for postprocessing are small compared to the effort required by the solver. Numerical results are presented including problems from the SDPLIB and the NETLIB LP library; these libraries...
Numerous efforts in the literature are devoted to studying error bounds in optimization problems. Th...
The goal of this paper is to develop some computational experience and test the practical relevance ...
This paper provides a short introduction to optimization problems with semidefinite constraints. Bas...
A wide variety of problems in global optimization, combinatorial optimization as well as systems and...
Many current deterministic solvers for NP-hard combinatorial optimization problems are based on nonl...
Abstract. Many current deterministic solvers for NP-hard combinato-rial optimization problems are ba...
A longstanding problem related to floating-point implementation of numerical programs is to provide ...
18 pages, 2 tables, 1 figureInternational audienceA longstanding problem related to floating-point i...
Originated from the practical implementation and numerical considerations of iterative methods for s...
Roundoff errors cannot be avoided when implementing numerical programs with finite precision. The ab...
Linear Programming has numerous applications, e.g., operations research, relaxations in global optim...
Abstract. Current mixed-integer linear programming solvers are based on linear programming routines ...
We survey how semidefinite programming can be used for finding good approximative solutions to hard...
We consider the problem of minimizing a polynomial on the hypercube [0, 1]n and derive new error bou...
We survey how semidefinite programming can be used for finding good approximative solutions to hard ...
Numerous efforts in the literature are devoted to studying error bounds in optimization problems. Th...
The goal of this paper is to develop some computational experience and test the practical relevance ...
This paper provides a short introduction to optimization problems with semidefinite constraints. Bas...
A wide variety of problems in global optimization, combinatorial optimization as well as systems and...
Many current deterministic solvers for NP-hard combinatorial optimization problems are based on nonl...
Abstract. Many current deterministic solvers for NP-hard combinato-rial optimization problems are ba...
A longstanding problem related to floating-point implementation of numerical programs is to provide ...
18 pages, 2 tables, 1 figureInternational audienceA longstanding problem related to floating-point i...
Originated from the practical implementation and numerical considerations of iterative methods for s...
Roundoff errors cannot be avoided when implementing numerical programs with finite precision. The ab...
Linear Programming has numerous applications, e.g., operations research, relaxations in global optim...
Abstract. Current mixed-integer linear programming solvers are based on linear programming routines ...
We survey how semidefinite programming can be used for finding good approximative solutions to hard...
We consider the problem of minimizing a polynomial on the hypercube [0, 1]n and derive new error bou...
We survey how semidefinite programming can be used for finding good approximative solutions to hard ...
Numerous efforts in the literature are devoted to studying error bounds in optimization problems. Th...
The goal of this paper is to develop some computational experience and test the practical relevance ...
This paper provides a short introduction to optimization problems with semidefinite constraints. Bas...