Conflict-free hypergraph matchings

Abstract

A celebrated theorem of Pippenger, and Frankl and R\"odl states that every almost-regular, uniform hypergraph H with small maximum codegree has an almost-perfect matching. We extend this result by obtaining a ``conflict-free'' matching, where conflicts are encoded via a collection C of subsets C⊂eq E(H). We say that a matching M⊂eq E(H) is conflict-free if M does not contain an element of C as a subset. Under natural assumptions on C, we prove that H has a conflict-free, almost-perfect matching. This has many applications, one of which yields new asymptotic results for so-called ``high-girth'' Steiner systems. Our main tool is a random greedy algorithm which we call the ``conflict-free matching process''.

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