Andr\'asfai--Erdos--S\'os theorem for the generalized triangle

Abstract

The celebrated Andr\'asfai--Erdos--S\'os Theorem from 1974 shows that every n-vertex triangle-free graph with minimum degree greater than 2n/5 must be bipartite. Its extensions to 3-uniform hypergraphs without the generalized triangle F5 = \abc, abd, cde\ have been explored in several previous works such as~LMR23unif,HLZ24, demonstrating the existence of > 0 such that for large n, every n-vertex F5-free 3-graph with minimum degree greater than (1/9-) n2 must be 3-partite. We determine the optimal value for by showing that for n 5000, every n-vertex F5-free 3-graph with minimum degree greater than 4n2/45 must be 3-partite, thus establishing the first tight Andr\'asfai--Erdos--S\'os type theorem for hypergraphs. As a corollary, for all positive n, every n-vertex cancellative 3-graph with minimum degree greater than 4n2/45 must be 3-partite. This result is also optimal and considerably strengthens prior work, such as that by Bollob\'as~Bol74 and Keevash--Mubayi~KM04Cancel.

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