Twins in ordered hyper-matchings
Abstract
An ordered r-matching of size n is an r-uniform hypergraph on a linearly ordered set of vertices, consisting of n pairwise disjoint edges. Two ordered r-matchings are isomorphic if there is an order-preserving isomorphism between them. A pair of twins in an ordered r-matching is formed by two vertex disjoint isomorphic sub-matchings. Let t(r)(n) denote the maximum size of twins one may find in every ordered r-matching of size n. By relating the problem to that of largest twins in permutations and applying some recent Erdos-Szekeres-type results for ordered matchings, we show that t(r)(n)=(n35·(2r-1-1)) for every fixed r≥slant 2. On the other hand, t(r)(n)=O(n2r+1), by a simple probabilistic argument. As our main result, we prove that, for almost all ordered r-matchings of size n, the size of the largest twins achieves this bound.
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