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Related papers: Lectures on 0/1-polytopes

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We present slight refinements of known general lower and upper bounds on sizes of extended formulations for polytopes. With these observations we are able to compute the extension complexities of all 0/1-polytopes up to dimension 4. We…

Combinatorics · Mathematics 2014-06-20 Michael Oelze , Arnaud Vandaele , Stefan Weltge

In Rothvo\ss{} it was shown that there exists a 0/1 polytope (a polytope whose vertices are in \{0,1\}^{n}) such that any higher-dimensional polytope projecting to it must have 2^{\Omega(n)} facets, i.e., its linear extension complexity is…

Computational Complexity · Computer Science 2013-12-04 Jop Briët , Daniel Dadush , Sebastian Pokutta

We present a number of complexity results concerning the problem of counting vertices of an integral polytope defined by a system of linear inequalities. The focus is on polytopes with small integer vertices, particularly 0/1 polytopes and…

Computational Complexity · Computer Science 2022-05-04 Heng Guo , Mark Jerrum

We provide a characterization of the compressed lattice polytopes in terms of their facet defining inequalities and we show that every compressed lattice polytope is affinely isomorphic to a 0/1-polytope. As an application, we characterize…

Combinatorics · Mathematics 2007-06-13 Seth Sullivant

We prove that every 0/1-polytope has a unique Minkowski decomposition into indecomposable polytopes, up to translation of summands. The summands lie in pairwise orthogonal subspaces. Thus, every 0/1-polytope is the Cartesian product of…

Combinatorics · Mathematics 2026-05-22 Akihiro Higashitani , Arnau Padrol , Raman Sanyal

Let P be a random $d$-dimensional 0/1-polytope with $n(d)$ vertices, and denote by $\phi_k(P)$ the \emph{$k$-face density} of $P$, i.e., the quotient of the number of $k$-dimensional faces of $P$ and $\binom{n(d)}{k+1}$. For each $k\ge 2$,…

Combinatorics · Mathematics 2007-05-23 Volker Kaibel

We give a complete enumeration of all 2-neighborly 0/1-polytopes of dimension 7. There are 13 959 358 918 different 0/1-equivalence classes of such polytopes. They form 5 850 402 014 combinatorial classes and 1 274 089 different f-vectors.…

Combinatorics · Mathematics 2019-04-09 Aleksandr Maksimenko

We introduce the simple extension complexity of a polytope P as the smallest number of facets of any simple (i.e., non-degenerate in the sense of linear programming) polytope which can be projected onto P. We devise a combinatorial method…

Combinatorics · Mathematics 2015-01-23 Volker Kaibel , Matthias Walter

Let $Q_n$ denote the $n$-dimensional hypercube with the vertex set $V_n=\{0,1}^n$. A 0/1-polytope of $Q_n$ is a convex hull of a subset of $V_n$. This paper is concerned with the enumeration of equivalence classes of full-dimensional…

Combinatorics · Mathematics 2011-01-04 William Y. C. Chen , Peter L. Guo

We introduce revlex-initial 0/1-polytopes as the convex hulls of reverse-lexicographically initial subsets of 0/1-vectors. These polytopes are special knapsack-polytopes. It turns out that they have remarkable extremal properties. In…

Combinatorics · Mathematics 2007-05-23 Volker Kaibel , Rafael Mechtel

We give compact extended formulations for the packing and partitioning orbitopes (with respect to the full symmetric group) described and analyzed in (Kaibel and Pfetsch, 2008). These polytopes are the convex hulls of all 0/1-matrices with…

Combinatorics · Mathematics 2008-06-14 Yuri Faenza , Volker Kaibel

We prove that there are 0/1 polytopes P that do not admit a compact LP formulation. More precisely we show that for every n there is a sets X \subseteq {0,1}^n such that conv(X) must have extension complexity at least 2^{n/2 * (1-o(1))}. In…

Combinatorics · Mathematics 2011-05-03 Thomas Rothvoß

We present new pivot rules for the Simplex method for LPs over 0/1 polytopes. We show that the number of non-degenerate steps taken using these rules is strongly polynomial and even linear in the dimension or in the number of variables. Our…

Optimization and Control · Mathematics 2021-11-30 Alexander Black , Jesús De Loera , Sean Kafer , Laura Sanità

An \emph{interval vector} is a $(0,1)$-vector in $\mathbb{R}^n$ for which all the 1's appear consecutively, and an \emph{interval-vector polytope} is the convex hull of a set of interval vectors in $\mathbb{R}^n$. We study three particular…

Combinatorics · Mathematics 2013-10-07 Matthias Beck , Jessica De Silva , Gabriel Dorfsman-Hopkins , Joseph Pruitt , Amanda Ruiz

We characterize the edges of two classes of $0/1$-polytopes. The first class corresponds to the stable set polytope of a graph $G$ and includes chain polytopes of posets, some instances of matroid independence polytopes, as well as…

Combinatorics · Mathematics 2021-10-27 Farid Aliniaeifard , Carolina Benedetti , Nantel Bergeron , Shu Xiao Li , Franco Saliola

We relate the maximum semidefinite and linear extension complexity of a family of polytopes to the cardinality of this family and the minimum pairwise Hausdorff distance of its members. This result directly implies a known lower bound on…

Optimization and Control · Mathematics 2016-05-30 Gennadiy Averkov , Volker Kaibel , Stefan Weltge

The extension complexity of a polytope measures its amenability to succinct representations via lifts. There are several versions of extension complexity, including linear, real semidefinite, and complex semidefinite. We focus on the last…

Combinatorics · Mathematics 2021-10-18 Tristram Bogart , João Gouveia , Juan Camilo Torres

This is a survey on algorithmic questions about combinatorial and geometric properties of convex polytopes. We give a list of 35 problems; for each the current state of knowledege on its theoretical complexity status is reported. The…

Combinatorics · Mathematics 2007-05-23 Volker Kaibel , Marc E. Pfetsch

The lectures are devoted to a remarkable class of $3$-dimensional polytopes, which are mathematical models of the important object of quantum physics, quantum chemistry and nanotechnology -- fullerenes. The main goal is to show how results…

Algebraic Topology · Mathematics 2016-09-13 Victor M. Buchstaber , Nickolai Erokhovets

Over the past twenty years, lecture hall partitions have emerged as fundamental combinatorial structures, leading to new generalizations and interpretations of classical theorems and new results. In recent years, geometric approaches to…

Combinatorics · Mathematics 2016-07-07 Carla D. Savage
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