Abstract in HTML and working paper for download in PDF available via World Wide Web at the Social Science Research Network.Title from cover. "January 2002."Includes bibliographical references (leaves 32-34).The goal of this paper is to develop some computational experience and test the practical relevance of the theory of condition numbers C(d) for linear optimization, as applied to problem instances that one might encounter in practice. We used the NETLIB suite of linear optimization problems as a test bed for condition number computation and analysis. Our computational results indicate that 72% of the NETLIB suite problem instances are ill-conditioned. However, after pre-processing heuristics are applied, only 19% of the post-processed pr...
Cover title.Includes bibliographical references (p. 47-48).Supported through NSF Graduate Research F...
Linear programming problems can be solved with high precision using reliable and fast IPM (interior-...
The purpose of this paper is to extend, as much as possible, the modern theory of condition numbers ...
The goal of this paper is to develop some computational experience and test the practical relevance ...
The modern theory of condition numbers for convex optimization problems was initially developed for ...
The modern theory of condition measures for convex optimization problems was initially developed fo...
The modern theory of condition measures for convex optimization problems was initially developed for...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Sloan School of Management, 2002.Includes bi...
In recent years, new and powerful research into "condition numbers" for convex optimization has been...
The computational aspects of the simplex algorithm are investigated, and high performance computing ...
ii This thesis gives an overall survey of preprocessing and postprocessing techniques in linear opti...
Duality played, and continues to play a crucial role in the advancement of solving LinearOptimizatio...
We present novel, efficient algorithms for solving extremely large optimization problems. A signific...
Over the last 25 years, interior-point methods (IPMs) have emerged as a viable class of algorithms f...
For any linear program, we show that a slight random relative perturbation of that linear program ha...
Cover title.Includes bibliographical references (p. 47-48).Supported through NSF Graduate Research F...
Linear programming problems can be solved with high precision using reliable and fast IPM (interior-...
The purpose of this paper is to extend, as much as possible, the modern theory of condition numbers ...
The goal of this paper is to develop some computational experience and test the practical relevance ...
The modern theory of condition numbers for convex optimization problems was initially developed for ...
The modern theory of condition measures for convex optimization problems was initially developed fo...
The modern theory of condition measures for convex optimization problems was initially developed for...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Sloan School of Management, 2002.Includes bi...
In recent years, new and powerful research into "condition numbers" for convex optimization has been...
The computational aspects of the simplex algorithm are investigated, and high performance computing ...
ii This thesis gives an overall survey of preprocessing and postprocessing techniques in linear opti...
Duality played, and continues to play a crucial role in the advancement of solving LinearOptimizatio...
We present novel, efficient algorithms for solving extremely large optimization problems. A signific...
Over the last 25 years, interior-point methods (IPMs) have emerged as a viable class of algorithms f...
For any linear program, we show that a slight random relative perturbation of that linear program ha...
Cover title.Includes bibliographical references (p. 47-48).Supported through NSF Graduate Research F...
Linear programming problems can be solved with high precision using reliable and fast IPM (interior-...
The purpose of this paper is to extend, as much as possible, the modern theory of condition numbers ...