The edge formulation of the stable set problem is defined by two-variable constraints, one for each edge of a graph G, expressing the simple condition that two adjacent nodes cannot belong to a stable set. We study the fractional stable set polytope, i.e. the polytope defined by the linear relaxation of the edge formulation. Even if this polytope is a weak approximation of the stable set polytope, its simple geometrical structure provides deep theoretical insight as well as interesting algorithmic opportunities. Exploiting a graphic characterization of the bases, we first redefine pivots in terms of simple graphic operations, that turn a given basis into an adjacent one. These results lead us to prove that the combinatorial diameter of the ...
The maximum stable set problem is a well-known NP-hard problem in combinatorial optimization, which ...
The maximum stable set problem is a well-known NP-hard problem in combinatorial optimization, which ...
Warren M. Hirsch posed the conjecture which bears his name in a letter of 1957 to George B. Dantzig....
, expressing the simple condition that two adjacent nodes cannot belong to a stable set. We study th...
Given a graph, the edge formulation of the stable set problem is defined by two-variable constraints...
Given a graph, the edge formulation of the stable set problem is defined by two-variable constraints...
We study Lovász and Schrijver's hierarchy of relaxations based on positive semidefiniteness constrai...
We consider the edge formulation of the stable set problem. We characterize its corner polyhedron, i...
AbstractWe study two polyhedral lift-and-project operators (originally proposed by Lovász and Schrij...
International audienceThe purpose of this paper is the formal verification of a counterexample of Sa...
The Hirsch Conjecture states that for a d-dimensional polytope with n facets, the diameter of the gr...
We study the classical stable marriage and stable roommates problems using a polyhedral approach. We...
AbstractSeveral applications of methods from nonlinear algebra to the stable set problem in graphs a...
The Hirsch conjecture was posed in 1957 in a question from Warren M. Hirsch to George Dantzig. It st...
We study the stable set polytope P (Gn ) for the graph Gn with n nodes and edges [i, j] when |i-j| ...
The maximum stable set problem is a well-known NP-hard problem in combinatorial optimization, which ...
The maximum stable set problem is a well-known NP-hard problem in combinatorial optimization, which ...
Warren M. Hirsch posed the conjecture which bears his name in a letter of 1957 to George B. Dantzig....
, expressing the simple condition that two adjacent nodes cannot belong to a stable set. We study th...
Given a graph, the edge formulation of the stable set problem is defined by two-variable constraints...
Given a graph, the edge formulation of the stable set problem is defined by two-variable constraints...
We study Lovász and Schrijver's hierarchy of relaxations based on positive semidefiniteness constrai...
We consider the edge formulation of the stable set problem. We characterize its corner polyhedron, i...
AbstractWe study two polyhedral lift-and-project operators (originally proposed by Lovász and Schrij...
International audienceThe purpose of this paper is the formal verification of a counterexample of Sa...
The Hirsch Conjecture states that for a d-dimensional polytope with n facets, the diameter of the gr...
We study the classical stable marriage and stable roommates problems using a polyhedral approach. We...
AbstractSeveral applications of methods from nonlinear algebra to the stable set problem in graphs a...
The Hirsch conjecture was posed in 1957 in a question from Warren M. Hirsch to George Dantzig. It st...
We study the stable set polytope P (Gn ) for the graph Gn with n nodes and edges [i, j] when |i-j| ...
The maximum stable set problem is a well-known NP-hard problem in combinatorial optimization, which ...
The maximum stable set problem is a well-known NP-hard problem in combinatorial optimization, which ...
Warren M. Hirsch posed the conjecture which bears his name in a letter of 1957 to George B. Dantzig....