Optimality of a linear inequality in finitely many graph invariants is defined through a geometric approach. For a fixed number of graph vertices, consider all the tuples of values taken by the invariants on a selected class of graphs. Then form the polytope which is the convex hull of all these tuples. By definition, the optimal linear inequalities correspond to the facets of this polytope. They are finite in number, are logically independent, and generate precisely all the linear inequalities valid on the class of graphs. The computer system GraPHedron, developed by some of the authors, is able to produce experimental data about such inequalities for a "small" number of vertices. It greatly helps in conjecturing optimal linear inequalitie...
none4Given a graph G=(V,E) on n vertices, the Minimum Linear Arrangement Problem (MinLA) calls for a...
International audienceLinearity and contiguity are two parameters devoted to graph encoding. Lineari...
We study the problem of optimizing over the set of all combinatorial embeddings of a given planar gr...
Optimality of a linear inequality in finitely many graph invariants is defined through a geometric a...
Optimality of a linear inequality in finitely many graph invariants is de-fined through a geometric ...
AbstractWe present a new computer system, called GraPHedron, which uses a polyhedral approach to hel...
This monograph deals with mathematical constructions that are foundational in such an important area...
The structural properties of graphs are usually characterized in terms of invariants, which are func...
This monograph deals with mathematical constructions that are foundational in such an important area...
International audienceIn this paper we show that the contiguity and linearity of cographs on n verti...
The graph of a linear equation is a straight line. The graph of a linear inequality is the half of t...
In this document are given Linear Program formulations of several graph problems related to the acyc...
AbstractErdös and Gallai characterize in [3] the sequences of integers which are degree sequences of...
Linearity and contiguity are two parameters devoted to graph encoding. Linearity is a generalization...
Data mining and pattern recognition are areas based on the mathematical constructions discussed in t...
none4Given a graph G=(V,E) on n vertices, the Minimum Linear Arrangement Problem (MinLA) calls for a...
International audienceLinearity and contiguity are two parameters devoted to graph encoding. Lineari...
We study the problem of optimizing over the set of all combinatorial embeddings of a given planar gr...
Optimality of a linear inequality in finitely many graph invariants is defined through a geometric a...
Optimality of a linear inequality in finitely many graph invariants is de-fined through a geometric ...
AbstractWe present a new computer system, called GraPHedron, which uses a polyhedral approach to hel...
This monograph deals with mathematical constructions that are foundational in such an important area...
The structural properties of graphs are usually characterized in terms of invariants, which are func...
This monograph deals with mathematical constructions that are foundational in such an important area...
International audienceIn this paper we show that the contiguity and linearity of cographs on n verti...
The graph of a linear equation is a straight line. The graph of a linear inequality is the half of t...
In this document are given Linear Program formulations of several graph problems related to the acyc...
AbstractErdös and Gallai characterize in [3] the sequences of integers which are degree sequences of...
Linearity and contiguity are two parameters devoted to graph encoding. Linearity is a generalization...
Data mining and pattern recognition are areas based on the mathematical constructions discussed in t...
none4Given a graph G=(V,E) on n vertices, the Minimum Linear Arrangement Problem (MinLA) calls for a...
International audienceLinearity and contiguity are two parameters devoted to graph encoding. Lineari...
We study the problem of optimizing over the set of all combinatorial embeddings of a given planar gr...