English

Extended formulations for polygons

Discrete Mathematics 2012-11-26 v2 Computational Geometry Combinatorics

Abstract

The extension complexity of a polytope PP is the smallest integer kk such that PP is the projection of a polytope QQ with kk facets. We study the extension complexity of nn-gons in the plane. First, we give a new proof that the extension complexity of regular nn-gons is O(logn)O(\log n), a result originating from work by Ben-Tal and Nemirovski (2001). Our proof easily generalizes to other permutahedra and simplifies proofs of recent results by Goemans (2009), and Kaibel and Pashkovich (2011). Second, we prove a lower bound of 2n\sqrt{2n} on the extension complexity of generic nn-gons. Finally, we prove that there exist nn-gons whose vertices lie on a O(n)×O(n2)O(n) \times O(n^2) integer grid with extension complexity Ω(n/logn)\Omega(\sqrt{n}/\sqrt{\log n}).

Keywords

Cite

@article{arxiv.1107.0371,
  title  = {Extended formulations for polygons},
  author = {Samuel Fiorini and Thomas Rothvoß and Hans Raj Tiwary},
  journal= {arXiv preprint arXiv:1107.0371},
  year   = {2012}
}

Comments

10 pages, 2 figures; Revised version accepted for publication in Discrete & Computational Geometry

R2 v1 2026-06-21T18:30:56.550Z