A criterion for Andr\'asfai--Erdos--S\'os type theorems and applications

Abstract

The classical Andr\'asfai--Erdos--S\'os Theorem states that for 2, every n-vertex K+1-free graph with minimum degree greater than 3-43-1n must be -partite. We establish a simple criterion for r-graphs, r ≥ 2, to exhibit an Andr\'asfai--Erdos--S\'os type property, also known as degree-stability. This leads to a classification of most previously studied hypergraph families with this property. An immediate application of this result, combined with a general theorem by Keevash--Lenz--Mubayi, solves the spectral Tur\'an problems for a large class of hypergraphs. For every r-graph F with degree-stability, there is a simple algorithm to decide the F-freeness of an n-vertex r-graph with minimum degree greater than (π(F) - F)nr-1 in time O(nr), where F >0 is a constant. In particular, for the complete graph K+1, we can take K+1 = (32-)-1, and this bound is tight up to some multiplicative constant factor unless W[1] = FPT. Based on a result by Chen--Huang--Kanj--Xia, we further show that for every fixed C > 0, this problem cannot be solved in time no() if we replace K+1 with (C)-1 unless ETH fails. Furthermore, we apply the degree-stability of K+1 to decide the K+1-freeness of graphs whose size is close to the Tur\'an bound in time (+1)n2, partially improving a recent result by Fomin--Golovach--Sagunov--Simonov. As an intermediate step, we show that for a specific class of r-graphs F, the (surjective) F-coloring problem can be solved in time O(nr), provided the input r-graph has n vertices and a large minimum degree, refining several previous results.