Note on the Tur\'an number of the 3-linear hypergraph C13

Abstract

Let the crown C13 be the linear 3-graph on 9 vertices \a,b,c,d,e,f,g,h,i\ with edges E = \\a,b,c\, \a, d,e\, \b, f, g\, \c, h,i\\. Proving a conjecture of Gy\'arf\'as et. al., we show that for any crown-free linear 3-graph G on n vertices, its number of edges satisfy E(G) ≤ 3(n - s)2 where s is the number of vertices in G with degree at least 6. This result, combined with previous work, essentially completes the determination of linear Tur\'an number for linear 3-graphs with at most 4 edges.