Ramsey properties of randomly perturbed hypergraphs
Abstract
We study Ramsey properties of randomly perturbed 3-uniform hypergraphs. For~t≥ 2, write K(3)t to denote the 3-uniform expanded clique hypergraph obtained from the complete graph Kt by expanding each of the edges of the latter with a new additional vertex. For an even integer t≥ 4, let~M denote the asymmetric maximal density of the pair ( K(3)t, K(3)t/2). We prove that adding a set~F of random hyperedges satisfying |F| n3-1/M to a given n-vertex 3-uniform hypergraph~H with non-vanishing edge density asymptotically almost surely results in a perturbed hypergraph enjoying the Ramsey property for K(3)t and two colours. We conjecture that this result is asymptotically best possible with respect to the size of F whenever t≥ 6 is even. The key tools of our proof are a new variant of the hypergraph regularity lemma accompanied with a tuple lemma providing appropriate control over joint link graphs. Our variant combines the so called strong and the weak hypergraph regularity lemmata.
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