Families with no perfect matchings

Abstract

We consider families of k-subsets of \1, …, n\, where n is a multiple of k, which have no perfect matching. An equivalent condition for a family F to have no perfect matching is for there to be a blocking set, which is a set of b elements of \1, …, n\ that cannot be covered by b disjoint sets in F. We are specifically interested in the largest possible size of a family F with no perfect matching and no blocking set of size less than b. Frankl resolved the case of families with no singleton blocking set (in other words, the b=2 case) for sufficiently large n and conjectured an optimal construction for general b. Though Frankl's construction fails to be optimal for k = 2, 3, we show that the construction is optimal whenever k 100 and n is sufficiently large.