Add to ORKGIn recent years, new and powerful research into "condition numbers" for convex optimization has been developed, aimed at capturing the intuitive notion of problem behavior. This research has been shown to be important in studying the efficiency of algorithms, including interior-point algorithms, for convex optimization as well as other behavioral characteristics of these problems such as problem geometry, deformation under data perturbation, etc. This paper studies measures of conditioning for a conic linear system of the form (FPd): Ax = b, x E Cx, whose data is d = (A, b). We present a new measure of conditioning, denoted pd, and we show implications of lid for problem geometry and algorithm complexity, and demonstrate that the value of =...
In this paper we present a general theory for transforming a normalized homogeneous conic system F :...
"September 1997."Includes bibliographical references (p. 28-29).by R.M. Freund and J.R. Vera
The analysis of iterative algorithms solving a conic feasibility problem Ay ∈ K, with A a linear map...
The purpose of this paper is to extend, as much as possible, the modern theory of condition numbers ...
The modern theory of condition measures for convex optimization problems was initially developed for...
The modern theory of condition numbers for convex optimization problems was initially developed for ...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Sloan School of Management, 2002.Includes bi...
The modern theory of condition measures for convex optimization problems was initially developed fo...
Cover title.Includes bibliographical references (p. 47-48).Supported through NSF Graduate Research F...
Abstract in HTML and working paper for download in PDF available via World Wide Web at the Social Sc...
"December 1998."Includes bibliographical references (p. 36-38).by M. Epelman and R. Freund
In this paper we present two algorithms for computing estimates of condition measures for a convex f...
Abstract. The analysis of iterative algorithms solving a conic feasi-bility problem Ay ∈ K, with A a...
For a conic linear system of the form Ax ∈ K, K a convex cone, several condition measures have been ...
For a conic linear system of the form Ax ∈ K, K a convex cone, several condition measures have been ...
In this paper we present a general theory for transforming a normalized homogeneous conic system F :...
"September 1997."Includes bibliographical references (p. 28-29).by R.M. Freund and J.R. Vera
The analysis of iterative algorithms solving a conic feasibility problem Ay ∈ K, with A a linear map...
The purpose of this paper is to extend, as much as possible, the modern theory of condition numbers ...
The modern theory of condition measures for convex optimization problems was initially developed for...
The modern theory of condition numbers for convex optimization problems was initially developed for ...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Sloan School of Management, 2002.Includes bi...
The modern theory of condition measures for convex optimization problems was initially developed fo...
Cover title.Includes bibliographical references (p. 47-48).Supported through NSF Graduate Research F...
Abstract in HTML and working paper for download in PDF available via World Wide Web at the Social Sc...
"December 1998."Includes bibliographical references (p. 36-38).by M. Epelman and R. Freund
In this paper we present two algorithms for computing estimates of condition measures for a convex f...
Abstract. The analysis of iterative algorithms solving a conic feasi-bility problem Ay ∈ K, with A a...
For a conic linear system of the form Ax ∈ K, K a convex cone, several condition measures have been ...
For a conic linear system of the form Ax ∈ K, K a convex cone, several condition measures have been ...
In this paper we present a general theory for transforming a normalized homogeneous conic system F :...
"September 1997."Includes bibliographical references (p. 28-29).by R.M. Freund and J.R. Vera
The analysis of iterative algorithms solving a conic feasibility problem Ay ∈ K, with A a linear map...