We propose simple polynomial-time algorithms for two linear conic feasibility problems. For a matrix A ∈ Rm×n, the kernel problem requires a positive vector in the kernel of A, and the image problem requires a positive vector in the image of AT. Both algorithms iterate between simple first-order steps and rescaling steps. These rescalings improve natural geometric potentials. If Goffin's condition measure ρA is negative, then the kernel problem is feasible, and the worst-case complexity of the kernel algorithm is O((m3n + mn2)log|ρA|−1); if ρA > 0, then the image problem is feasible, and the image algorithm runs in time O(m2n2 log ρA−1). We also extend the image algorithm to the oracle setting. We address the degenerate case ρA = 0 by extendi...
In this paper, we propose a large-update interior-point algorithm for linear optimization based o...
This paper presents an algorithm for finding feasible solutions of linear matrix inequalities. The a...
Following the breakthrough work of Tardos in the bit-complexity model, Vavasis and Ye gave the first...
We propose simple polynomial-time algorithms for two linear conic feasibility problems. For a matrix...
The classical perceptron algorithm is an elementary row-action/relaxation algorithm for solving a ho...
Following the breakthrough work of Tardos (Oper. Res. '86) in the bit-complexity model, Vavasis and ...
The classical perceptron algorithm is an elementary row-action/relaxation algorithm for solving a ho...
Let us consider a linear feasibility problem with a possibly innite number of inequality constraints...
We show that the perceptron algorithm along with periodic rescaling solves linear programs in polyno...
We develop an algorithm for resolving a conic linear system (FPd), which is a system of the form (FP...
We propose two simple polynomial-time algorithms to find a positive solution to Ax=0Ax=0 . Both algo...
The classical perceptron algorithm is an elementary row-action/relaxation algorithm for solving a ho...
The perceptron algorithm, developed mainly in the machine learning literature, is a simple greedy me...
Conic linear programming is a powerful modelling technique with many applications in engineering, pl...
Convex optimisation is used to solve many problems of interest in optimal control, signal processing...
In this paper, we propose a large-update interior-point algorithm for linear optimization based o...
This paper presents an algorithm for finding feasible solutions of linear matrix inequalities. The a...
Following the breakthrough work of Tardos in the bit-complexity model, Vavasis and Ye gave the first...
We propose simple polynomial-time algorithms for two linear conic feasibility problems. For a matrix...
The classical perceptron algorithm is an elementary row-action/relaxation algorithm for solving a ho...
Following the breakthrough work of Tardos (Oper. Res. '86) in the bit-complexity model, Vavasis and ...
The classical perceptron algorithm is an elementary row-action/relaxation algorithm for solving a ho...
Let us consider a linear feasibility problem with a possibly innite number of inequality constraints...
We show that the perceptron algorithm along with periodic rescaling solves linear programs in polyno...
We develop an algorithm for resolving a conic linear system (FPd), which is a system of the form (FP...
We propose two simple polynomial-time algorithms to find a positive solution to Ax=0Ax=0 . Both algo...
The classical perceptron algorithm is an elementary row-action/relaxation algorithm for solving a ho...
The perceptron algorithm, developed mainly in the machine learning literature, is a simple greedy me...
Conic linear programming is a powerful modelling technique with many applications in engineering, pl...
Convex optimisation is used to solve many problems of interest in optimal control, signal processing...
In this paper, we propose a large-update interior-point algorithm for linear optimization based o...
This paper presents an algorithm for finding feasible solutions of linear matrix inequalities. The a...
Following the breakthrough work of Tardos in the bit-complexity model, Vavasis and Ye gave the first...