A degree sequence strengthening of the vertex degree threshold for a perfect matching in 3-uniform hypergraphs

Abstract

The study of asymptotic minimum degree thresholds that force matchings and tilings in hypergraphs is a lively area of research in combinatorics. A key breakthrough in this area was a result of H\`an, Person and Schacht who proved that the asymptotic minimum vertex degree threshold for a perfect matching in an n-vertex 3-graph is (59+o(1))n2. In this paper we improve on this result, giving a family of degree sequence results, all of which imply the result of H\`an, Person and Schacht, and additionally allow one third of the vertices to have degree 19n2 below this threshold. Furthermore, we show that this result is, in some sense, tight.