Universal probability bounds for partial Latin squares

Abstract

This paper studies the probability of substructures occurring in random Latin squares. Our main result states that if α,β>0 are such that 2α+β<1, then there are positive constants δ= δ(α, β) and Δ= Δ(α, β) such that if P is a partial Latin square of order n with k = k(n) non-empty cells occupying at most αn rows and βn columns, the probability that a random Latin square of order n contains P lies between (δ/n)k and (Δ/n)k. We apply this result to subsquares in random Latin squares to obtain the first proof of the fact that the expected number of subsquares of order 3 in a random Latin square of order n is non-vanishing as n ∞. We are also able to provide the best known asymptotics for the expected number of subsquares of order a in a random Latin square of order n when 2<a=o(n1/2). Finally, we discuss the implications of our result on other configurations in random Latin squares as well as on completions of partial Latin squares.