A new approach to the results of K\"ovari, S\'os, and Tur\'an concerning rectangle-free subsets of the grid

Abstract

For positive integers m and n, define f(m,n) to be the smallest integer such that any subset A of the m × n integer grid with |A| ≥ f(m,n) contains a rectangle; that is, there are x∈ [m] and y ∈ [n] and d1,d2 ∈ Z+ such that all four points (x,y), (x+d1,y), (x,y+d2), and (x+d1,y+d2) are contained in A. In kovarisosturan, K\"ovari, S\'os, and Tur\'an showed that k ∞f(k,k)k3/2 = 1. They also showed that whenever p is a prime number, f(p2,p2+p) = p2(p+1)+1. We recover their asymptotic result and strengthen the second, providing cleaner proofs which exploit a connection to projective planes, first noticed by Mendelsohn in mendelsohn87. We also provide an explicit lower bound for f(k,k) which holds for all k.