In general, many general mathematical formulations of uncertainty quantification problems are NP-hard, meaning that (unless it turned out that P = NP) no feasible algorithm is possible that would always solve these problems. In this paper, we argue that if we restrict ourselves to practical problems, then the correspondingly restricted problems become feasible -- namely, they can be solved by using linear programming techniques
International audienceDecision-making problems can be mod-eled as combinatorial optimization problem...
The ever growing performances of mathematical programming solvers allows to be thinking of solving m...
Quantum Logic, born of the attempts of J. von Neumann, P. Jordan, E. Wigner, and G. Birkhoff, to pro...
We treat in this paper Linear Programming (LP) problems with uncertain data. The focus is on uncerta...
In many real world problems, dealing with uncertainty is a significant challenge for mathematical pr...
We have recently proposed a rigorous framework for Uncertainty Quantification (UQ) in which UQ objec...
We treat in this paper linear programming (LP) problems with uncertain data. The focus is on uncerta...
We propose a rigorous framework for Uncertainty Quantification (UQ) in which the UQ objectives and ...
In practical problem situations data are usually inherently unreliable. A mathematical representatio...
In most real-life situations, we have uncertainty: we do not know the exact state of the world, ther...
Uncertainty Quantification (UQ) is a relatively new research area which describes the methods and ap...
The objective of uncertainty quantification is to certify that a given physical, engineering or econ...
A framework for the development of implicit solvers for incompressible flow problem
The constraint programming paradigm has proved to have the flexibility and efficiency necessary to t...
We investigate a constrained optimization problem for which there is uncertainty about a constraint ...
International audienceDecision-making problems can be mod-eled as combinatorial optimization problem...
The ever growing performances of mathematical programming solvers allows to be thinking of solving m...
Quantum Logic, born of the attempts of J. von Neumann, P. Jordan, E. Wigner, and G. Birkhoff, to pro...
We treat in this paper Linear Programming (LP) problems with uncertain data. The focus is on uncerta...
In many real world problems, dealing with uncertainty is a significant challenge for mathematical pr...
We have recently proposed a rigorous framework for Uncertainty Quantification (UQ) in which UQ objec...
We treat in this paper linear programming (LP) problems with uncertain data. The focus is on uncerta...
We propose a rigorous framework for Uncertainty Quantification (UQ) in which the UQ objectives and ...
In practical problem situations data are usually inherently unreliable. A mathematical representatio...
In most real-life situations, we have uncertainty: we do not know the exact state of the world, ther...
Uncertainty Quantification (UQ) is a relatively new research area which describes the methods and ap...
The objective of uncertainty quantification is to certify that a given physical, engineering or econ...
A framework for the development of implicit solvers for incompressible flow problem
The constraint programming paradigm has proved to have the flexibility and efficiency necessary to t...
We investigate a constrained optimization problem for which there is uncertainty about a constraint ...
International audienceDecision-making problems can be mod-eled as combinatorial optimization problem...
The ever growing performances of mathematical programming solvers allows to be thinking of solving m...
Quantum Logic, born of the attempts of J. von Neumann, P. Jordan, E. Wigner, and G. Birkhoff, to pro...