This paper presents the convergence proof and complexity analysis of an interior-point framework that solves linear programming problems by dynamically selecting and adding relevant inequalities. First, we formulate a new primal–dual interior-point algorithm for solving linear programmes in non-standard form with equality and inequality constraints. The algorithm uses a primal–dual path-following predictor–corrector short-step interior-point method that starts with a reduced problem without any inequalities and selectively adds a given inequality only if it becomes active on the way to optimality. Second, we prove convergence of this algorithm to an optimal solution at which all inequalities are satisfied regardless of whether they have bee...
AbstractA new comprehensive implementation of a primal-dual algorithm for linear programming is desc...
Many issues that are crucial for an efficient implementation of an interior point algorithm are addr...
Written for specialists working in optimization, mathematical programming, or control theory. The ge...
In this paper the abstract of the thesis "New Interior Point Algorithms in Linear Programming&...
The Primal-Dual (PD) path-following interior point algorithm for solving Linear Programming (LP) pro...
A new initialization or `Phase I' strategy for feasible interior point methods for linear programmin...
Linear programs (LPs) are one of the most basic and important classes of constrained optimization pr...
The choice of the centering (or barrier) parameter and the step length parameter are the fundamental...
The modern era of interior-point methods dates to 1984, when Karmarkar proposed his algorithm for li...
This work concerns primal-dual interior-point methods for semidefinite programming (SDP) that use a ...
robust primal-dual interior point algorithm for nonlinear programs ∗ Xinwei Liu†and Jie Sun‡ Abstrac...
We study the local convergence of a primal-dual interior point method for nonlinear programming. A l...
This paper proposes two sets of rules, Rule G and Rule P, for controlling step lengths in a generic ...
. In this paper we present a convergence analysis for some inexact variants of the infeasible-interi...
A class of large- and small- update primal-dual interior-point point algorithms for linear optimizat...
AbstractA new comprehensive implementation of a primal-dual algorithm for linear programming is desc...
Many issues that are crucial for an efficient implementation of an interior point algorithm are addr...
Written for specialists working in optimization, mathematical programming, or control theory. The ge...
In this paper the abstract of the thesis "New Interior Point Algorithms in Linear Programming&...
The Primal-Dual (PD) path-following interior point algorithm for solving Linear Programming (LP) pro...
A new initialization or `Phase I' strategy for feasible interior point methods for linear programmin...
Linear programs (LPs) are one of the most basic and important classes of constrained optimization pr...
The choice of the centering (or barrier) parameter and the step length parameter are the fundamental...
The modern era of interior-point methods dates to 1984, when Karmarkar proposed his algorithm for li...
This work concerns primal-dual interior-point methods for semidefinite programming (SDP) that use a ...
robust primal-dual interior point algorithm for nonlinear programs ∗ Xinwei Liu†and Jie Sun‡ Abstrac...
We study the local convergence of a primal-dual interior point method for nonlinear programming. A l...
This paper proposes two sets of rules, Rule G and Rule P, for controlling step lengths in a generic ...
. In this paper we present a convergence analysis for some inexact variants of the infeasible-interi...
A class of large- and small- update primal-dual interior-point point algorithms for linear optimizat...
AbstractA new comprehensive implementation of a primal-dual algorithm for linear programming is desc...
Many issues that are crucial for an efficient implementation of an interior point algorithm are addr...
Written for specialists working in optimization, mathematical programming, or control theory. The ge...