English

Faces of Birkhoff Polytopes

Combinatorics 2013-04-16 v1

Abstract

The Birkhoff polytope B(n) is the convex hull of all (n x n) permutation matrices, i.e., matrices where precisely one entry in each row and column is one, and zeros at all other places. This is a widely studied polytope with various applications throughout mathematics. In this paper we study combinatorial types L of faces of a Birkhoff polytope. The Birkhoff dimension bd(L) of L is the smallest n such that B(n) has a face with combinatorial type L. By a result of Billera and Sarangarajan, a combinatorial type L of a d-dimensional face appears in some B(k) for k less or equal to 2d, so bd(L) is at most d. We will characterize those types whose Birkhoff dimension is at least 2d-3, and we prove that any type whose Birkhoff dimension is at least d is either a product or a wedge over some lower dimensional face. Further, we computationally classify all d-dimensional combinatorial types for d between 2 and 8.

Keywords

Cite

@article{arxiv.1304.3948,
  title  = {Faces of Birkhoff Polytopes},
  author = {Andreas Paffenholz},
  journal= {arXiv preprint arXiv:1304.3948},
  year   = {2013}
}

Comments

29 pages

R2 v1 2026-06-21T23:59:24.390Z