Triple systems with bounded matching number: some constructions and exact Tur\'an number
Abstract
We study the Tur\'an numbers of 3-graphs avoiding 3-graphs F and Ms+13, a matching of size s+1. We disprove a conjecture of Gerbner, Tompkins, and Zhou [European Journal of Combinatorics, 2025, 127:104155] on (n,\F,M3s+1\) for 3-graph F with (F)=2 by constructing infinitely many counterexamples. For this family, we determine the asymptotic Tur\'an number via edge-colored Tur\'an problem. In addition, for the 3-graph F3,2 with edge set \123,145,245,345\, we determine the exact value of (n,\F3,2, Ms+13\) for every integers s and all n 12s2.
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