Hypergraph Tur\'an problem of the generalized triangle with bounded matching number
Abstract
Let H be a 3-graph on n vertices. The matching number (H) is defined as the maximum number of disjoint edges in H. The generalized triangle F5 is a 3-graph on the vertex set \a,b,c,d,e\ with the edge set \abc, abd,cde\. In this paper, we showed that an F5-free 3-graph H with matching number at most s has at most s (n-s)2/4 edges for n≥ 30(s+1) and s≥ 3. For the proof, we establish a 2-colored version of Mantel's theorem, which may be of independent interests.
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