Erdos-Szekeres type Theorems for ordered uniform matchings

Abstract

For r,n2, an ordered r-uniform matching of size n is an r-uniform hypergraph on a linearly ordered vertex set V, with |V|=rn, consisting of n pairwise disjoint edges. There are 122rr different ways two edges may intertwine, called here patterns. Among them we identify 3r-1 collectable patterns P, which have the potential of appearing in arbitrarily large quantities called P-cliques. We prove an Erdos-Szekeres type result guaranteeing in every ordered r-uniform matching the presence of a P-clique of a prescribed size, for some collectable pattern P. In particular, in the diagonal case, one of the P-cliques must be of size ( n31-r). In addition, for each collectable pattern P we show that the largest size of a P-clique in a random ordered r-uniform matching of size n is, with high probability, (n1/r).