English

Intercalates and Discrepancy in Random Latin Squares

Combinatorics 2017-01-18 v2

Abstract

An intercalate in a Latin square is a 2×22\times2 Latin subsquare. Let NN be the number of intercalates in a uniformly random n×nn\times n Latin square. We prove that asymptotically almost surely N(1o(1))n2/4N\ge\left(1-o\left(1\right)\right)\,n^{2}/4, and that EN(1+o(1))n2/2\mathbb{E}N\le\left(1+o\left(1\right)\right)\,n^{2}/2 (therefore asymptotically almost surely Nfn2N\le fn^{2} for any ff\to\infty). This significantly improves the previous best lower and upper bounds. We also give an upper tail bound for the number of intercalates in two fixed rows of a random Latin square. In addition, we discuss a problem of Linial and Luria on low-discrepancy Latin squares.

Cite

@article{arxiv.1607.04981,
  title  = {Intercalates and Discrepancy in Random Latin Squares},
  author = {Matthew Kwan and Benny Sudakov},
  journal= {arXiv preprint arXiv:1607.04981},
  year   = {2017}
}
R2 v1 2026-06-22T14:56:58.731Z