AbstractWe present results on how partial knowledge helps to solve linear programs. In particular, if a linear system,Ax=bandx≥0, has an interior feasible point, then we show that finding a feasible point to this system can be done inO(n2.5c(A)) iterations by the layered interior-point method, and each iteration solves a least-squares problem, wherenis the dimension of vectorxandc(A) is the condition number of matrixAdefined by Vavasis and Ye. This complexity bound is reduced by a factornfrom that when this property does not exists. We also present a result for solving the problem using a little strong knowledge
The modern era of interior-point methods dates to 1984, when Karmarkar proposed his algorithm for li...
In this thesis, we consider two closely related problems. The first is a full-rank weighted least-s...
There are several classes of interior point algorithms that solve linear programming problems in O(V...
AbstractWe present results on how partial knowledge helps to solve linear programs. In particular, i...
We propose a "layered-step" interior point (LIP) algorithm for linear programming. This algorithm fo...
The layered-step interior-point algorithm was introduced by Vavasis and Ye. The algorithm accelerate...
In a dynamical systems paradigm, many optimization algorithms are equivalent to applying forward Eul...
Linear programming is now included in algorithm undergraduate and postgraduate courses for computer ...
This paper presents the convergence proof and complexity analysis of an interior-point framework tha...
A new initialization or `Phase I' strategy for feasible interior point methods for linear programmin...
Abstract. In this paper we present a variant of Vavasis and Ye’s layered-step path-following primal-...
Whereas interior point methods provide polynomial-time linear programming algorithms, the running ti...
Following the breakthrough work of Tardos (Oper. Res. '86) in the bit-complexity model, Vavasis and ...
In this paper the abstract of the thesis "New Interior Point Algorithms in Linear Programming&...
The class of sufficient matrices is important in the study of the linear complementarity problem (LC...
The modern era of interior-point methods dates to 1984, when Karmarkar proposed his algorithm for li...
In this thesis, we consider two closely related problems. The first is a full-rank weighted least-s...
There are several classes of interior point algorithms that solve linear programming problems in O(V...
AbstractWe present results on how partial knowledge helps to solve linear programs. In particular, i...
We propose a "layered-step" interior point (LIP) algorithm for linear programming. This algorithm fo...
The layered-step interior-point algorithm was introduced by Vavasis and Ye. The algorithm accelerate...
In a dynamical systems paradigm, many optimization algorithms are equivalent to applying forward Eul...
Linear programming is now included in algorithm undergraduate and postgraduate courses for computer ...
This paper presents the convergence proof and complexity analysis of an interior-point framework tha...
A new initialization or `Phase I' strategy for feasible interior point methods for linear programmin...
Abstract. In this paper we present a variant of Vavasis and Ye’s layered-step path-following primal-...
Whereas interior point methods provide polynomial-time linear programming algorithms, the running ti...
Following the breakthrough work of Tardos (Oper. Res. '86) in the bit-complexity model, Vavasis and ...
In this paper the abstract of the thesis "New Interior Point Algorithms in Linear Programming&...
The class of sufficient matrices is important in the study of the linear complementarity problem (LC...
The modern era of interior-point methods dates to 1984, when Karmarkar proposed his algorithm for li...
In this thesis, we consider two closely related problems. The first is a full-rank weighted least-s...
There are several classes of interior point algorithms that solve linear programming problems in O(V...