Homogeneous substructures in random ordered uniform matchings
Abstract
An ordered r-uniform matching of size n is a collection of n pairwise disjoint r-subsets of a linearly ordered set of rn vertices. For n=2, such a matching is called an r-pattern, as it represents one of 122rr ways two disjoint edges may intertwine. Given a set P of r-patterns, a P-clique is a matching with all pairs of edges belonging to P. In this paper we determine the order of magnitude of the size of a largest P-clique in a random ordered r-uniform matching for several sets P, including all sets of size |P|2 and the set R(r) of all 2r-1 r-partite r-patterns.
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