Matchings in hypergraphs via Ore-degree conditions
Abstract
Let H ⊂eq [n]r be an r-uniform hypergraph on vertex set [n] = \1,2,…, n\. For an r-set of vertices S ⊂eq [n], the degree of S is defined as deg(S)=Σv ∈ Sdeg(v) and the minimum of deg(S) over all non-edge r-subsets S ∈ E(H) of V( H) is the Ore-degree of H, denoted by σr( H). We prove several Ore-degree results about existence of matchings in hypergraphs: (1) For n≥ 2r+2, if H is an intersecting r-uniform hypergraph on n vertices, then σr( H)≤ rn-2 r-2, and there is equality only when H is a 1-star. (2) For r≥ 3 and n≥ 4r2, if is a non-trivial intersecting r-uniform hypergraph on n vertices, then σr( H)≤ r(n-2 r-2-n-r-2 r-2). (3) For s≥ 2 and n≥ 3r2(s-1), if H is an r-uniform hypergraph on n vertices and σr( H)>r(n-1 r-1-n-s r-1), then H contains s pairwise disjoint edges.
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