The new concepts of repelling inequalities, repelling paths, and prime analytic centers are introduced. A repelling path is a generalization of the analytic central path for linear programming, and we show that this path has a unique limit. Furthermore, this limit is the prime analytic center if the set of repelling inequalities contains only those constraints that ‘‘shape’ ’ the polytope. Because we allow lower dimensional polytopes, the proof techniques are nonstandard and follow from data perturbation analysis. This analysis overcomes the difficulty that analytic centers of lower dimensional polytopes are not necessarily continuous with respect to the polytope’s data representation. A second concept introduced here is that of the ‘‘prime...
In the first part of the paper we survey some far-reaching applications of the basic facts of linear...
We propose a generic path-following scheme which is essentially a method of centers that can be impl...
htmlabstractWe solve a 20-year old problem posed by Yannakakis and prove that there exists no polyno...
The main ingredient for polynomiality in interior point methods is the centering procedure. All inte...
In the paper of Liao and Todd [3] two weighted centers are introduced and used to design algorithms ...
An Analog of Karmarkar's Algorithm for Inequality Constrained Linear Programs, with a New Class of P...
While properties of the weighted central path for linear and non-linear programs have been studied f...
textabstractIn this paper we consider properties of the central path and the analytic center of the ...
We propose a generic path-following scheme which is essentially a method of centers that can be impl...
Abstract. Consider a convex polyhedral set represented by a system of linear inequalities. A prime r...
ABSTRACT. Let R be the convex subset of IRn defined by q simultaneous linear matrix in-equalities (L...
The analytic center o of an n-dimensional polytope P = {x E R": aTx- b, 2 0 (i = 1.2,...,m)...
The analytic center cutting plane (ACCPM) methods aims to solve nondifferentiable convex problems. T...
Abstract. We present a target-following framework for semidefinite programming, which generalizes th...
In the first part of the paper we survey some far reaching applications of the basis facts of linear...
In the first part of the paper we survey some far-reaching applications of the basic facts of linear...
We propose a generic path-following scheme which is essentially a method of centers that can be impl...
htmlabstractWe solve a 20-year old problem posed by Yannakakis and prove that there exists no polyno...
The main ingredient for polynomiality in interior point methods is the centering procedure. All inte...
In the paper of Liao and Todd [3] two weighted centers are introduced and used to design algorithms ...
An Analog of Karmarkar's Algorithm for Inequality Constrained Linear Programs, with a New Class of P...
While properties of the weighted central path for linear and non-linear programs have been studied f...
textabstractIn this paper we consider properties of the central path and the analytic center of the ...
We propose a generic path-following scheme which is essentially a method of centers that can be impl...
Abstract. Consider a convex polyhedral set represented by a system of linear inequalities. A prime r...
ABSTRACT. Let R be the convex subset of IRn defined by q simultaneous linear matrix in-equalities (L...
The analytic center o of an n-dimensional polytope P = {x E R": aTx- b, 2 0 (i = 1.2,...,m)...
The analytic center cutting plane (ACCPM) methods aims to solve nondifferentiable convex problems. T...
Abstract. We present a target-following framework for semidefinite programming, which generalizes th...
In the first part of the paper we survey some far reaching applications of the basis facts of linear...
In the first part of the paper we survey some far-reaching applications of the basic facts of linear...
We propose a generic path-following scheme which is essentially a method of centers that can be impl...
htmlabstractWe solve a 20-year old problem posed by Yannakakis and prove that there exists no polyno...