Add to ORKGWe study the linear extension complexity of stable set polytopes of perfect graphs. We make use of known structural results permitting to decompose perfect graphs into basic perfect graphs by means of two graph operations: 2-join and skew partitions. Exploiting the link between extension complexity and the nonnegative rank of an associated slack matrix, we investigate the behaviour of the extension complexity under these graph operations. We show bounds for the extension complexity of the stable set polytope of a perfect graph G depending linearly on the size of G and involving the depth of a decomposition tree of G in terms of basic perfect graphs
In this thesis we investigate a number of problems related to 2-level polytopes, in particular from ...
International audienceA 2-join is an edge cutset that naturally appears in decomposition of several ...
AbstractA 2-join is an edge cutset that naturally appears in decomposition of several classes of gra...
We study the linear extension complexity of stable set polytopes of perfect graphs. We make use of k...
In linear programming one can formulate many combinatorial optimization problems as optimizing a lin...
The extension complexity xc(P) of a polytope P is the minimum number of facets of a polytope that af...
AbstractWe study some operations on graphs in relation to the stable set polytope, for instance, ide...
AbstractFor some graph classes defined by forbidding one-vertex extensions of the P4, we introduce a...
Courcelle’s theorem states that given an MSO formula ϕ and a graph G with n vertices and treewidth τ...
In this paper we extend recent results of Fiorini et al. on the extension complexity of the cut poly...
A linear extension of a polytope is any polytope which can be mapped onto via an affine transformati...
Let P be a finite poset. By definition, the linear extension polytope of P has as vertices the chara...
In this paper we study lift-and-project polyhedral operators defined by Lovász and Schrijver and Bal...
AbstractSeveral applications of methods from nonlinear algebra to the stable set problem in graphs a...
A graph $G$ with a two-node cutset decomposes into two pieces. A technique to describe the stable se...
In this thesis we investigate a number of problems related to 2-level polytopes, in particular from ...
International audienceA 2-join is an edge cutset that naturally appears in decomposition of several ...
AbstractA 2-join is an edge cutset that naturally appears in decomposition of several classes of gra...
We study the linear extension complexity of stable set polytopes of perfect graphs. We make use of k...
In linear programming one can formulate many combinatorial optimization problems as optimizing a lin...
The extension complexity xc(P) of a polytope P is the minimum number of facets of a polytope that af...
AbstractWe study some operations on graphs in relation to the stable set polytope, for instance, ide...
AbstractFor some graph classes defined by forbidding one-vertex extensions of the P4, we introduce a...
Courcelle’s theorem states that given an MSO formula ϕ and a graph G with n vertices and treewidth τ...
In this paper we extend recent results of Fiorini et al. on the extension complexity of the cut poly...
A linear extension of a polytope is any polytope which can be mapped onto via an affine transformati...
Let P be a finite poset. By definition, the linear extension polytope of P has as vertices the chara...
In this paper we study lift-and-project polyhedral operators defined by Lovász and Schrijver and Bal...
AbstractSeveral applications of methods from nonlinear algebra to the stable set problem in graphs a...
A graph $G$ with a two-node cutset decomposes into two pieces. A technique to describe the stable se...
In this thesis we investigate a number of problems related to 2-level polytopes, in particular from ...
International audienceA 2-join is an edge cutset that naturally appears in decomposition of several ...
AbstractA 2-join is an edge cutset that naturally appears in decomposition of several classes of gra...