Add to ORKGWe consider a system of m linear equations in n variables Ax = d and give necessary and sufficient conditions for the existence of a unique solution to the system that is integer: x ? {?1,1}n. We achieve this by reformulating the problem as a linear program and deriving necessary and sufficient conditions for the integer solution to be the unique primal optimal solution. We show that as long as m is larger than n/2, then the linear programming reformulation succeeds for most instances, but if m is less than n/2, the reformulation fails on most instances. We also demonstrate that these predictions match the empirical performance of the linear programming formulation to very high accuracy
Recently a strong connection has been shown between the tractability of integer programming (IP) wit...
In this section is presented a new integer number algorithm for linear equation. This algorithm is m...
Abstract. We consider the problem of enumerating all minimal integer solutions of a monotone system ...
A simple randomized algorithm is given for finding an integer solution to a system of linear Diophan...
A simple randomized algorithm is given for finding an integer solution to a system of linear Diophan...
Consider systems of two-variable linear equations of the form xi−xj = cij, where the cij ’s are inte...
The utility of this article is that it establishes if the number of the natural solutions of a gener...
Consider systems of two-variable linear equations of the form xi−xj = cij , where the cij ’s are int...
AbstractA number of characterizations are given which are both necessary and sufficient for the uniq...
AbstractWe discuss a “binary” algorithm for solving systems of linear equations with integer coeffic...
AbstractLet Ax = B be a system of m × n linear equations with integer coefficients. Assume the rows ...
In this section is presented a new integer number algorithm for linear equation. This algorithm is m...
An algorithm is given that ascertains whether a linear equation has integer number solutions or not;...
AbstractIn this paper, we present a new algorithm for the exact solutions of linear systems with int...
AbstractWe describe an algorithm that first decides whether the primal-dual pair of linear programsm...
Recently a strong connection has been shown between the tractability of integer programming (IP) wit...
In this section is presented a new integer number algorithm for linear equation. This algorithm is m...
Abstract. We consider the problem of enumerating all minimal integer solutions of a monotone system ...
A simple randomized algorithm is given for finding an integer solution to a system of linear Diophan...
A simple randomized algorithm is given for finding an integer solution to a system of linear Diophan...
Consider systems of two-variable linear equations of the form xi−xj = cij, where the cij ’s are inte...
The utility of this article is that it establishes if the number of the natural solutions of a gener...
Consider systems of two-variable linear equations of the form xi−xj = cij , where the cij ’s are int...
AbstractA number of characterizations are given which are both necessary and sufficient for the uniq...
AbstractWe discuss a “binary” algorithm for solving systems of linear equations with integer coeffic...
AbstractLet Ax = B be a system of m × n linear equations with integer coefficients. Assume the rows ...
In this section is presented a new integer number algorithm for linear equation. This algorithm is m...
An algorithm is given that ascertains whether a linear equation has integer number solutions or not;...
AbstractIn this paper, we present a new algorithm for the exact solutions of linear systems with int...
AbstractWe describe an algorithm that first decides whether the primal-dual pair of linear programsm...
Recently a strong connection has been shown between the tractability of integer programming (IP) wit...
In this section is presented a new integer number algorithm for linear equation. This algorithm is m...
Abstract. We consider the problem of enumerating all minimal integer solutions of a monotone system ...