Subsquares in random Latin squares and rectangles
Combinatorics
2023-11-10 v2
Abstract
A partial Latin rectangle is \textit{-sparse} if the number of nonempty entries in each row and column is at most and each symbol is used at most times. We prove that the probability a uniformly random Latin rectangle, where , contains a -sparse partial Latin rectangle with nonempty entries is for sufficiently large and sufficiently small . Using this result, we prove that a uniformly random order- Latin square asymptotically almost surely has no Latin subsquare of order greater than for an absolute constant .
Cite
@article{arxiv.2311.04152,
title = {Subsquares in random Latin squares and rectangles},
author = {Alexander Divoux and Tom Kelly and Camille Kennedy and Jasdeep Sidhu},
journal= {arXiv preprint arXiv:2311.04152},
year = {2023}
}
Comments
11 pages; 1 page appendix, corrected a typo in random Steiner system conjecture