Tur\'an Number of Generalized Triangles

Abstract

The family r consists of all r-graphs with three edges D1,D2,D3 such that |D1 D2|=r-1 and D1 D2 ⊂eq D3. A generalized triangle, Tr ∈ r is an r-graph on \1,2,…,2r-1\ with three edges D1, D2, D3, such that D1=\1,2,…,r-1, r\, D2= \1, 2, …, r-1, r+1 \ and D3 = \r, r+1, …, 2r-1\. Frankl and F\"uredi conjectured that for all r≥ 4, ex(n,r) = ex(n,Tr ) for all sufficiently large n and they also proved it for r=3. Later, Pikhurko showed that the conjecture holds for r=4. In this paper we determine ex(n,T5) and ex(n,T6) for sufficiently large n, proving the conjecture for r=5,6.