This paper describes and analyzes a method for finding nontrivial solutions of the inequality $Ax \geq 0$, where $A$ is an $m \times n$ matrix of rank $n$. The method is based on the observation that a certain function $f$ has a unique minimum if and only if the inequality {\it fails to have} a nontrivial solution. Moreover, if there is a solution, an attempt to minimize $f$ will produce a sequence that will diverge in a direction that converges to a solution of the inequality. The technique can also be used to solve inhomogeneous inequalities and hence linear programming problems, although no claims are made about competitiveness with existing methods
Abstract Based on a new efficient identification technique of active constraints introduced in this ...
AbstractAn iterative method for solving general systems of linear inequalities is considered. The me...
The problem of finding a feasible solution to a linear inequality system arises in numerous contexts...
AbstractThe iterative method of Cimmino for solving linear equations is generalized to linear inequa...
We describe a modified Newton type algorithm for the solution of linear inequality systems in the se...
AbstractThe problem of finding the middle of a feasible region defined by solutions to a set of line...
In this study we consider the problem of finding a feasible solution $\rm\bar x \in \IR\sp{n}$ to a ...
summary:This article presents a simple method for bounding a solution of a system of linear equation...
In this paper we present a polynomial-time procedure to find a low rank solution for a system of Lin...
It has been observed empirically that a simple linearization method applied to the problem of findin...
AbstractAn iterative method is described which rapidly computes the norm of a nonnegative matrix A, ...
AbstractWe present new linear convergence results for iterative methods for solving the variational ...
Abstract1Several algorithms are known that solve a system of m linear inequalities in n variables us...
. In 1980, Han [6] described a finitely terminating algorithm for solving a system Ax b of linear ...
Abstract. A system of linear equations Ax = b, in n unknowns and m equations which has a nonnegative...
Abstract Based on a new efficient identification technique of active constraints introduced in this ...
AbstractAn iterative method for solving general systems of linear inequalities is considered. The me...
The problem of finding a feasible solution to a linear inequality system arises in numerous contexts...
AbstractThe iterative method of Cimmino for solving linear equations is generalized to linear inequa...
We describe a modified Newton type algorithm for the solution of linear inequality systems in the se...
AbstractThe problem of finding the middle of a feasible region defined by solutions to a set of line...
In this study we consider the problem of finding a feasible solution $\rm\bar x \in \IR\sp{n}$ to a ...
summary:This article presents a simple method for bounding a solution of a system of linear equation...
In this paper we present a polynomial-time procedure to find a low rank solution for a system of Lin...
It has been observed empirically that a simple linearization method applied to the problem of findin...
AbstractAn iterative method is described which rapidly computes the norm of a nonnegative matrix A, ...
AbstractWe present new linear convergence results for iterative methods for solving the variational ...
Abstract1Several algorithms are known that solve a system of m linear inequalities in n variables us...
. In 1980, Han [6] described a finitely terminating algorithm for solving a system Ax b of linear ...
Abstract. A system of linear equations Ax = b, in n unknowns and m equations which has a nonnegative...
Abstract Based on a new efficient identification technique of active constraints introduced in this ...
AbstractAn iterative method for solving general systems of linear inequalities is considered. The me...
The problem of finding a feasible solution to a linear inequality system arises in numerous contexts...