The Operations Research model known as the Set Covering Problem has a wide range of applications. See for example the survey by Ceria, Nobili and Sassano and edited by Dell'Amico, Maffioli and Martello (Annotated Bibliographies in Combinatorial Optimization, Wiley, New York, 1997). Sometimes, due to the special structure of the constraint matrix, the natural linear programming relaxation yields an optimal solution that is integer, thus solving the problem. Under which conditions do such integrality properties hold? This question is of both theoretical and practical interest. On the theoretical side, polyhedral combinatorics and graph theory come together in this rich area of discrete mathematics. In this tutorial, we present the state of th...
none4siWe provide a simple description in terms of linear inequalities of the convex hull of the non...
Nesting problems are combinatorial optimisation problems where one or more pieces of material or spa...
AbstractMany combinatorial optimization problems call for the optimization of a linear function over...
AbstractThe Operations Research model known as the Set Covering Problem has a wide range of applicat...
A clutter L is a collection of subsets of a ground set E(L) with the property that, for every pair A...
This paper is about set packing relaxations of combinatorial optimization problems associated with a...
In this thesis, we study theoretical aspects of integer linear programming. This thesis consists of...
Lehman's theorem on the structure of minimally nonideal clutters is a fundamental result in polyhedr...
Many combinatorial optimization problems can be conceived of as optimizing a linear function over a ...
The last two decades have seen extraordinary advances in industrial applications of constraint satis...
Combinatorial optimization problems appear in many disciplines ranging from management and logistic...
This paper considers the polyhedral results and the min–max results on packing and covering problems...
AbstractWe consider two (0, 1)-linear programming formulations of the graph (vertex-) coloring probl...
Combinatorial optimization problems appear in many disciplines ranging from management and logistics...
International audienceWe consider two (0, 1)-linear programming formulations of the graph (vertex-) ...
none4siWe provide a simple description in terms of linear inequalities of the convex hull of the non...
Nesting problems are combinatorial optimisation problems where one or more pieces of material or spa...
AbstractMany combinatorial optimization problems call for the optimization of a linear function over...
AbstractThe Operations Research model known as the Set Covering Problem has a wide range of applicat...
A clutter L is a collection of subsets of a ground set E(L) with the property that, for every pair A...
This paper is about set packing relaxations of combinatorial optimization problems associated with a...
In this thesis, we study theoretical aspects of integer linear programming. This thesis consists of...
Lehman's theorem on the structure of minimally nonideal clutters is a fundamental result in polyhedr...
Many combinatorial optimization problems can be conceived of as optimizing a linear function over a ...
The last two decades have seen extraordinary advances in industrial applications of constraint satis...
Combinatorial optimization problems appear in many disciplines ranging from management and logistic...
This paper considers the polyhedral results and the min–max results on packing and covering problems...
AbstractWe consider two (0, 1)-linear programming formulations of the graph (vertex-) coloring probl...
Combinatorial optimization problems appear in many disciplines ranging from management and logistics...
International audienceWe consider two (0, 1)-linear programming formulations of the graph (vertex-) ...
none4siWe provide a simple description in terms of linear inequalities of the convex hull of the non...
Nesting problems are combinatorial optimisation problems where one or more pieces of material or spa...
AbstractMany combinatorial optimization problems call for the optimization of a linear function over...