Following the breakthrough work of Tardos in the bit-complexity model, Vavasis and Ye gave the first exact algorithm for linear programming in the real model of computation with running time depending only on the constraint matrix. For solving a linear program (LP) $\max\, c^\top x,\: Ax = b,\: x \geq 0,\: A \in \mathbb{R}^{m \times n}$, Vavasis and Ye developed a primal-dual interior point method using a 'layered least squares' (LLS) step, and showed that $O(n^{3.5} \log (\bar{\chi}_A+n))$ iterations suffice to solve (LP) exactly, where $\bar{\chi}_A$ is a condition measure controlling the size of solutions to linear systems related to $A$. Monteiro and Tsuchiya, noting that the central path is invariant under rescalings of the...
Recently, Eva Tardos developed an algorithm for solving the linear program min(cx: Ax = h, x> O) ...
AbstractWe consider the problem of finding a basic solution to a system of linear constraints (in st...
© 2017 IEEE. In this paper, we study matrix scaling and balancing, which are fundamental problems in...
Following the breakthrough work of Tardos in the bit-complexity model, Vavasis and Ye gave the first...
Following the breakthrough work of Tardos in the bit-complexity model, Vavasis and Ye gave the firs...
Following the breakthrough work of Tardos (Oper. Res. '86) in the bit-complexity model, Vavasis and ...
In his recent work, Dadush et al. introduced the condition number κ for constraint matrices of linea...
Abstract. In this paper we present a variant of Vavasis and Ye’s layered-step path-following primal-...
Consider solving a linear program in standard form where the constraint matrix $A$ is $m imes n$, w...
AbstractIn this paper, we consider the open problem of the complexity of the LLL algorithm in the ca...
AbstractWe present results on how partial knowledge helps to solve linear programs. In particular, i...
In this paper we show a simple treatment of the complexity of Linear Programming. We describe the sh...
In breakthrough work, Tardos (Oper. Res. ’86) gave a proximity based framework for solving linear pr...
Matrix scaling is an operation in which the rows and columns of a matrix are multiplied by positive ...
The complexity of linear programming is discussed in the "integer" and "real number" models of compu...
Recently, Eva Tardos developed an algorithm for solving the linear program min(cx: Ax = h, x> O) ...
AbstractWe consider the problem of finding a basic solution to a system of linear constraints (in st...
© 2017 IEEE. In this paper, we study matrix scaling and balancing, which are fundamental problems in...
Following the breakthrough work of Tardos in the bit-complexity model, Vavasis and Ye gave the first...
Following the breakthrough work of Tardos in the bit-complexity model, Vavasis and Ye gave the firs...
Following the breakthrough work of Tardos (Oper. Res. '86) in the bit-complexity model, Vavasis and ...
In his recent work, Dadush et al. introduced the condition number κ for constraint matrices of linea...
Abstract. In this paper we present a variant of Vavasis and Ye’s layered-step path-following primal-...
Consider solving a linear program in standard form where the constraint matrix $A$ is $m imes n$, w...
AbstractIn this paper, we consider the open problem of the complexity of the LLL algorithm in the ca...
AbstractWe present results on how partial knowledge helps to solve linear programs. In particular, i...
In this paper we show a simple treatment of the complexity of Linear Programming. We describe the sh...
In breakthrough work, Tardos (Oper. Res. ’86) gave a proximity based framework for solving linear pr...
Matrix scaling is an operation in which the rows and columns of a matrix are multiplied by positive ...
The complexity of linear programming is discussed in the "integer" and "real number" models of compu...
Recently, Eva Tardos developed an algorithm for solving the linear program min(cx: Ax = h, x> O) ...
AbstractWe consider the problem of finding a basic solution to a system of linear constraints (in st...
© 2017 IEEE. In this paper, we study matrix scaling and balancing, which are fundamental problems in...