What is the value of input information in solving linear programming? The celebrated ellipsoid algorithm tells us that the full information of input con-straints is not necessary; the algorithm works as long as there exists an oracle that, on a proposed candidate solution, returns a violation in the form of a separat-ing hyperplane. Can linear programming still be efficiently solved if the returned violation is in other formats? Motivated by some real-world scenarios, we study this question in a trial-and-error framework: there is an oracle that, upon a proposed solution, returns the index of a violated constraint (with the content of the constraint still hidden). When more than one constraint is violated, two variants in the model are inve...
We consider a class of linear programs involving a set of covering constraints of which at most k ar...
The objective function and the constraints can be formulated as linear functions of independent vari...
International audienceConvex polyhedra capture linear relations between variables. They are used in ...
We show that the ellipsoid method for solving linear programs can be implemented in a way that respe...
We consider linear programming in the oracle model: mincT x s.t. x ∊ P, where the polyhedron P = {x ...
The complexity of linear programming is discussed in the "integer" and "real number" models of compu...
Finding whether a linear-constraint loop has a linear ranking function is an important key to un-der...
This paper gives an algorithm for solving linear programming problems. For a problem with n constrai...
We consider a class of linear programs involving a set of covering constraints of which at most k ar...
We describe an approach for answering linear programming queries with respect to a set of $n$ linear...
International audienceOne way to solve very large linear programs in standard form is to apply a ran...
Abstract—Linear optimization is many times algorithmi-cally simpler than non-linear convex optimizat...
Cette thèse revisite de deux manières le domaine abstrait des polyèdres utilisé pour l'analyse stati...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
AbstractMany combinatorial optimization problems call for the optimization of a linear function over...
We consider a class of linear programs involving a set of covering constraints of which at most k ar...
The objective function and the constraints can be formulated as linear functions of independent vari...
International audienceConvex polyhedra capture linear relations between variables. They are used in ...
We show that the ellipsoid method for solving linear programs can be implemented in a way that respe...
We consider linear programming in the oracle model: mincT x s.t. x ∊ P, where the polyhedron P = {x ...
The complexity of linear programming is discussed in the "integer" and "real number" models of compu...
Finding whether a linear-constraint loop has a linear ranking function is an important key to un-der...
This paper gives an algorithm for solving linear programming problems. For a problem with n constrai...
We consider a class of linear programs involving a set of covering constraints of which at most k ar...
We describe an approach for answering linear programming queries with respect to a set of $n$ linear...
International audienceOne way to solve very large linear programs in standard form is to apply a ran...
Abstract—Linear optimization is many times algorithmi-cally simpler than non-linear convex optimizat...
Cette thèse revisite de deux manières le domaine abstrait des polyèdres utilisé pour l'analyse stati...
Linear and semidefinite programs are fundamental algorithmic tools, often providing conjecturallyopt...
AbstractMany combinatorial optimization problems call for the optimization of a linear function over...
We consider a class of linear programs involving a set of covering constraints of which at most k ar...
The objective function and the constraints can be formulated as linear functions of independent vari...
International audienceConvex polyhedra capture linear relations between variables. They are used in ...