Positive codegree 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. We establish a positive codegree extension of this result for the r-uniform generalized triangle Tr = \\1,…, r-1,r\, \1,…, r-1,r+1\,\r,r+1, …, 2r-1\\ For every n (r-1)(2r+1)/2, if H is an n-vertex Tr-free r-uniform hypergraph in which each (r-1)-tuple of vertices is contained in either zero edges or more than 2n/(2r+1) edges of H, then H is r-partite. This result provides the first tight positive codegree Andr\'asfai--Erdos--S\'os type theorem for hypergraphs. It also immediately implies that the positive codegree Tur\'an number of Tr is n/r for all r. Additionally, for r=3, our result answers one of the questions posed by Hou et al.~HLYZZ22 in a strong form.

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