Permutations that separate close elements, and rectangle packings in the torus
Combinatorics
2023-06-07 v1
Abstract
Let , and be positive integers. For distinct , define to be the distance between and when the elements of are written in a circle. So A permutation is \emph{-clash-free} if whenever . So an -clash-free permutation moves every pair of close elements (at distance less than ) to a pair of elements at large distance (at distance at least ). The notion of an -clash-free permutation can be reformulated in terms of certain packings of rectangles on an torus. For integers and with , let be the largest value of such that an -clash-free permutation of exists. Strengthening a recent paper of Blackburn, which proved a conjecture of Mammoliti and Simpson, we determine the value of in all cases.
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