English

Combined tilings and separated set-systems

Combinatorics 2016-09-20 v3

Abstract

In 1998, Leclerc and Zelevinsky introduced the notion of weakly separated collections of subsets of the ordered nn-element set [n][n] (using this notion to give a combinatorial characterization for quasi-commuting minors of a quantum matrix). They conjectured the purity of certain natural domains D2[n]D\subseteq 2^{[n]} (in particular, of the hypercube 2[n]2^{[n]} itself, and the hyper-simplex {X[n] ⁣:X=m}\{X\subseteq[n]\colon |X|=m\} for mm fixed), where DD is called pure if all maximal weakly separated collections in DD have the same cardinality. These conjectures have been answered affirmatively. In this paper, generalizing those earlier results, we reveal wider classes of pure domains in 2[n]2^{[n]}. This is obtained as a consequence of our study of a novel geometric--combinatorial model for weakly separated set-systems, so-called \emph{combined (polygonal) tilings} on a zonogon, which yields a new insight in the area.

Keywords

Cite

@article{arxiv.1401.6418,
  title  = {Combined tilings and separated set-systems},
  author = {Vladimir I. Danilov and Alexander V. Karzanov and Gleb A. Koshevoy},
  journal= {arXiv preprint arXiv:1401.6418},
  year   = {2016}
}

Comments

30 pages. Revised version. To appear in Selecta Mathematica

R2 v1 2026-06-22T02:54:21.067Z