The length of an s-increasing sequence of r-tuples

Abstract

We prove a number of results related to a problem of Po-Shen Loh, which is equivalent to a problem in Ramsey theory. Let a=(a1,a2,a3) and b=(b1,b2,b3) be two triples of integers. Define a to be 2-less than b if ai<bi for at least two values of i, and define a sequence a1,…,am of triples to be 2-increasing if ar is 2-less than as whenever r<s. Loh asks how long a 2-increasing sequence can be if all the triples take values in \1,2,…,n\, and gives a * improvement over the trivial upper bound of n2 by using the triangle removal lemma. In the other direction, a simple construction gives a lower bound of n3/2. We look at this problem and a collection of generalizations, improving some of the known bounds, pointing out connections to other well known problems in extremal combinatorics, and asking a number of further questions.