English

Homogeneous substructures in random ordered hyper-matchings

Combinatorics 2026-02-09 v2

Abstract

An ordered rr-uniform matching of size nn is a collection of nn pairwise disjoint rr-subsets of a linearly ordered set of rnrn vertices. For n=2n=2, such a matching is called an rr-pattern, as it represents one of 12(2rr)\tfrac12\binom{2r}r ways two disjoint edges may intertwine. Given a set P\mathcal{P} of rr-patterns, a P\mathcal{P}-clique is a matching with all pairs of edges order-isomorphic to a member of P\mathcal{P}. In this paper we are interested in the size of a largest P\mathcal{P}-clique in a random ordered rr-uniform matching selected uniformly from all such matchings on a fixed vertex set [rn][rn]. We determine this size (up to multiplicative constants) for several sets P\mathcal{P}, including all sets of size P2|\mathcal{P}|\le2, the set R(r)\mathcal{R}^{(r)} of all rr-partite patterns, as well as sets P\mathcal{P} enjoying a Boolean-like, symmetric structure.

Keywords

Cite

@article{arxiv.2507.20374,
  title  = {Homogeneous substructures in random ordered hyper-matchings},
  author = {Andrzej Dudek and Jarosław Grytczuk and Jakub Przybyło and Andrzej Ruciński},
  journal= {arXiv preprint arXiv:2507.20374},
  year   = {2026}
}
R2 v1 2026-07-01T04:21:10.810Z