Given a polytope $P\subseteq\R^n$, the Chvátal-Gomory procedure computes iteratively the integer hull $P_I$ of $P$. The Chvátal rank of $P$ is the minimal number of iterations needed to obtain $P_I$. It is always finite, but already the Chvátal rank of polytopes in $\R^2$ can be arbitrarily large. In this paper, we study polytopes in the 0/1~cube, which are of particular interest in combinatorial optimization. We show that the Chvátal rank of any polytope $P\subseteq [0,1]^n$ is $\mbox{O}(n^3 \log n)$ and prove the linear upper and lower bound $n$ for the case $P\cap \Z^n = \emptyset$
For a polytope in the [0, 1]n cube, Eisenbrand and Schulz showed recently that the maximum Chvátal r...
AbstractWe prove two new upper bounds on the number of facets that a d -dimensional 0/1-polytope can...
The elementary closure P'; of a polyhedrom P is the intersection of P with all its Gomory-Chvátal cu...
Given a polytope $P\subseteq\R^n$, the Chvátal-Gomory procedure computes iteratively the integer hul...
AbstractGiven a polytope P⊆Rn, the Chvátal–Gomory procedure computes iteratively the integer hull PI...
Article dans revue scientifique avec comité de lecture.Given a polytope $P\subseteq\R^n$, the Chváta...
Given a polytope $P \subseteq \mathbb{R}^n$, the Chv\'atal-Gomory procedure computes iteratively the...
Gomory's and Chvátal's cutting-plane procedure proves recursively the validity of linear inequalit...
Gomory’s and Chvátal’s cutting-plane procedure proves recursively the validity of linear inequalitie...
Given a polytope P subset or equal R"n, the Chvatal-Gomory procedure computes iteratively the i...
Gomory's and Chvátal's cutting-plane procedure proves recursively the validity of linear inequalitie...
We provide a complete characterization of all polytopes P⊆[0,1]nP⊆[0,1][superscript n] with empty in...
Let S ⊂ {0; 1}n and R be any polytope contained in [0; 1]n with R ⊂ {0; 1}n = S. We prove that R has...
For a polytope in the [0; 1] n cube, Eisenbrand and Schulz showed recently that the maximum Chvatal ...
For a polytope in the [0; 1] n cube, Eisenbrand and Schulz showed recently that the maximum Chvatal ...
For a polytope in the [0, 1]n cube, Eisenbrand and Schulz showed recently that the maximum Chvátal r...
AbstractWe prove two new upper bounds on the number of facets that a d -dimensional 0/1-polytope can...
The elementary closure P'; of a polyhedrom P is the intersection of P with all its Gomory-Chvátal cu...
Given a polytope $P\subseteq\R^n$, the Chvátal-Gomory procedure computes iteratively the integer hul...
AbstractGiven a polytope P⊆Rn, the Chvátal–Gomory procedure computes iteratively the integer hull PI...
Article dans revue scientifique avec comité de lecture.Given a polytope $P\subseteq\R^n$, the Chváta...
Given a polytope $P \subseteq \mathbb{R}^n$, the Chv\'atal-Gomory procedure computes iteratively the...
Gomory's and Chvátal's cutting-plane procedure proves recursively the validity of linear inequalit...
Gomory’s and Chvátal’s cutting-plane procedure proves recursively the validity of linear inequalitie...
Given a polytope P subset or equal R"n, the Chvatal-Gomory procedure computes iteratively the i...
Gomory's and Chvátal's cutting-plane procedure proves recursively the validity of linear inequalitie...
We provide a complete characterization of all polytopes P⊆[0,1]nP⊆[0,1][superscript n] with empty in...
Let S ⊂ {0; 1}n and R be any polytope contained in [0; 1]n with R ⊂ {0; 1}n = S. We prove that R has...
For a polytope in the [0; 1] n cube, Eisenbrand and Schulz showed recently that the maximum Chvatal ...
For a polytope in the [0; 1] n cube, Eisenbrand and Schulz showed recently that the maximum Chvatal ...
For a polytope in the [0, 1]n cube, Eisenbrand and Schulz showed recently that the maximum Chvátal r...
AbstractWe prove two new upper bounds on the number of facets that a d -dimensional 0/1-polytope can...
The elementary closure P'; of a polyhedrom P is the intersection of P with all its Gomory-Chvátal cu...