Two stability theorems for K + 1r-saturated hypergraphs
Abstract
An F-saturated r-graph is a maximal r-graph not containing any member of F as a subgraph. Let K + 1r be the collection of all r-graphs F with at most +12 edges such that for some (+1)-set S every pair \u, v\ ⊂ S is covered by an edge in F. Our first result shows that for each ≥ r ≥ 2 every K+1r-saturated r-graph on n vertices with tr(n, ) - o(nr-1+1/) edges contains a complete -partite subgraph on (1-o(1))n vertices, which extends a stability theorem for K+1-saturated graphs given by Popielarz, Sahasrabudhe and Snyder. We also show that the bound is best possible. Our second result is motivated by a celebrated theorem of Andr\'asfai, Erdos and S\'os which states that for ≥ 2 every K+1-free graph G on n vertices with minimum degree δ(G) > 3-43-1n is -partite. We give a hypergraph version of it. The minimum positive co-degree of an r-graph H, denoted by δr-1+(H), is the maximum k such that if S is an (r-1)-set contained in a edge of H, then S is contained in at least k distinct edges of H. Let 3 be an integer and H be a K+13-saturated 3-graph on n vertices. We prove that if either 4 and δ2+(H) > 3-73-1n; or = 3 and δ2+(H) > 2n/7, then H is -partite; and the bound is best possible. This is the first stability result on minimum positive co-degree for hypergraphs.
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