The covering radius problem for sets of perfect matchings

Abstract

Consider the family of all perfect matchings of the complete graph K2n with 2n vertices. Given any collection M of perfect matchings of size s, there exists a maximum number f(n,x) such that if s≤ f(n,x), then there exists a perfect matching that agrees with each perfect matching in M in at most x-1 edges. We use probabilistic arguments to give several lower bounds for f(n,x). We also apply the Lov\'asz local lemma to find a function g(n,x) such that if each edge appears at most g(n, x) times then there exists a perfect matching that agrees with each perfect matching in M in at most x-1 edges. This is an analogue of an extremal result vis-\'a-vis the covering radius of sets of permutations, which was studied by Cameron and Wanless (cf. cameron), and Keevash and Ku (cf. ku). We also conclude with a conjecture of a more general problem in hypergraph matchings.