The Netlib library of linear programming problems is a well known suite containing many real world applications. Recently it was shown by Ordonez and Freund that 71% of these problems are ill-conditioned. Hence, numerical difficulties may occur. Here, we present rigorous results for this library that are computed by a verification method using interval arithmetic. In addition to the original input data of these problems we also consider interval input data. The computed rigorous bounds and the performance of the algorithms are related to the distance to the next ill-posed linear programming problem
Interval arithmetic is a means to compute verified results. However, a naive use of interval arithme...
The objective function and the constraints can be formulated as linear functions of independent vari...
The Reliable Computing journal has no more paper publication, only free, electronic publication.Inte...
Linear Programming has numerous applications, e.g., operations research, relaxations in global optim...
The goal of this paper is to develop some computational experience and test the practical relevance ...
Abstract. A wide variety of problems in global optimization, combinatorial optimization as well as s...
International audienceSolving numerically a linear system can be performed very efficiently, using o...
Interval arithmetic is a means to compute verified results. However, a naive use of interval arithme...
The conventional linear programming model requires the parameters which are known as constants. In t...
Linear systems represent the computational kernel of many models that describe problems arising in t...
Linear systems represent the computational kernel of many models that describe problems arising in t...
This thesis surveys the application of interval arithmetic to linear programming problems and presen...
This paper deals with the problems of checking strong solvability and feasibility of linear interval...
International audienceIn this paper we treat the case of some fundamental interval matrix operations...
Abstract. Current mixed-integer linear programming solvers are based on linear programming routines ...
Interval arithmetic is a means to compute verified results. However, a naive use of interval arithme...
The objective function and the constraints can be formulated as linear functions of independent vari...
The Reliable Computing journal has no more paper publication, only free, electronic publication.Inte...
Linear Programming has numerous applications, e.g., operations research, relaxations in global optim...
The goal of this paper is to develop some computational experience and test the practical relevance ...
Abstract. A wide variety of problems in global optimization, combinatorial optimization as well as s...
International audienceSolving numerically a linear system can be performed very efficiently, using o...
Interval arithmetic is a means to compute verified results. However, a naive use of interval arithme...
The conventional linear programming model requires the parameters which are known as constants. In t...
Linear systems represent the computational kernel of many models that describe problems arising in t...
Linear systems represent the computational kernel of many models that describe problems arising in t...
This thesis surveys the application of interval arithmetic to linear programming problems and presen...
This paper deals with the problems of checking strong solvability and feasibility of linear interval...
International audienceIn this paper we treat the case of some fundamental interval matrix operations...
Abstract. Current mixed-integer linear programming solvers are based on linear programming routines ...
Interval arithmetic is a means to compute verified results. However, a naive use of interval arithme...
The objective function and the constraints can be formulated as linear functions of independent vari...
The Reliable Computing journal has no more paper publication, only free, electronic publication.Inte...