Add to ORKGGeometric Programming is a useful tool with a wide range of applications in engineering. As in real-world problems input data is likely to be affected by uncertainty, Hsiung, Kim, and Boyd introduced robust geometric programming to include the uncertainty in the optimization process. They also developed a tractable approximation method to tackle this problem. Further, they pose the question whether there exists a tractable reformulation of their robust geometric programming model instead of only an approximation method. We give a negative answer to this question by showing that robust geometric programming is co-NP hard in its natural posynomial form
International audienceThe study of robustness problems for computational geometry algorithms is a to...
International audienceThe study of robustness problems for computational geometry algorithms is a to...
The field of solid modeling makes extensive use of a variety of geometric algorithms. When implemen...
Geometric Programming is a useful tool with a wide range of applications in engineering. As in real-...
This paper develops a simple bounding procedure for the optimal value of a posynomial geometric pro...
Geometric computation software tends to be fragile and fails occasionally. This robustness problem i...
This work represents an historical introduction of the Robust Geometric Computation problem (RGC) an...
This work represents an historical introduction of the Robust Geometric Computation problem (RGC) an...
This work represents an historical introduction of the Robust Geometric Computation problem (RGC) an...
Thesis: S.M., Massachusetts Institute of Technology, Computation for Design and Optimization Program...
This is a preliminary version of a chapter that will appear in the {\em Handbook on Computational Ge...
Robust optimization is a valuable alternative to stochastic programming, where all underlying probab...
This paper attempts to present an expository summary on the numerical non-robustness issues in geome...
Robustness issues due to imprecise arithmetic used in place of exact real number computation are a n...
Geometric programming (GP) is a powerful tool for solving a variety of optimization problems. Most G...
International audienceThe study of robustness problems for computational geometry algorithms is a to...
International audienceThe study of robustness problems for computational geometry algorithms is a to...
The field of solid modeling makes extensive use of a variety of geometric algorithms. When implemen...
Geometric Programming is a useful tool with a wide range of applications in engineering. As in real-...
This paper develops a simple bounding procedure for the optimal value of a posynomial geometric pro...
Geometric computation software tends to be fragile and fails occasionally. This robustness problem i...
This work represents an historical introduction of the Robust Geometric Computation problem (RGC) an...
This work represents an historical introduction of the Robust Geometric Computation problem (RGC) an...
This work represents an historical introduction of the Robust Geometric Computation problem (RGC) an...
Thesis: S.M., Massachusetts Institute of Technology, Computation for Design and Optimization Program...
This is a preliminary version of a chapter that will appear in the {\em Handbook on Computational Ge...
Robust optimization is a valuable alternative to stochastic programming, where all underlying probab...
This paper attempts to present an expository summary on the numerical non-robustness issues in geome...
Robustness issues due to imprecise arithmetic used in place of exact real number computation are a n...
Geometric programming (GP) is a powerful tool for solving a variety of optimization problems. Most G...
International audienceThe study of robustness problems for computational geometry algorithms is a to...
International audienceThe study of robustness problems for computational geometry algorithms is a to...
The field of solid modeling makes extensive use of a variety of geometric algorithms. When implemen...