English

Permutations that separate close elements, and rectangle packings in the torus

Combinatorics 2023-06-07 v1

Abstract

Let nn, ss and kk be positive integers. For distinct i,jZni,j\in\mathbb{Z}_n, define i,jn||i,j||_n to be the distance between ii and jj when the elements of Zn\mathbb{Z}_n are written in a circle. So i,jn=min{(ij)modn,(ji)modn}. ||i,j||_n=\min\{(i-j)\bmod n,(j-i)\bmod n\}. A permutation π:ZnZn\pi:\mathbb{Z}_n\rightarrow\mathbb {Z}_n is \emph{(s,k)(s,k)-clash-free} if π(i),π(j)nk||\pi(i),\pi(j)||_n\geq k whenever i,jn<s||i,j||_n<s. So an (s,k)(s,k)-clash-free permutation moves every pair of close elements (at distance less than ss) to a pair of elements at large distance (at distance at least kk). The notion of an (s,k)(s,k)-clash-free permutation can be reformulated in terms of certain packings of s×ks\times k rectangles on an n×nn\times n torus. For integers nn and kk with 1k<n1\leq k<n, let σ(n,k)\sigma(n,k) be the largest value of ss such that an (s,k)(s,k)-clash-free permutation of Zn\mathbb{Z}_n exists. Strengthening a recent paper of Blackburn, which proved a conjecture of Mammoliti and Simpson, we determine the value of σ(n,k)\sigma(n,k) in all cases.

Keywords

Cite

@article{arxiv.2306.03685,
  title  = {Permutations that separate close elements, and rectangle packings in the torus},
  author = {Simon R. Blackburn and Tuvi Etzion},
  journal= {arXiv preprint arXiv:2306.03685},
  year   = {2023}
}

Comments

21 pages, 6 figures

R2 v1 2026-06-28T10:57:49.253Z