Off-Diagonal Ramsey Numbers for Linear Hypergraphs
Abstract
We study off-diagonal Ramsey numbers r(H, Kn(k)) of k-uniform hypergraphs, where H is a fixed linear k-uniform hypergraph and Kn(k) is complete on n vertices. Recently, Conlon et al.\ disproved the folklore conjecture that r(H, Kn(3)) always grows polynomially in n. In this paper we show that much larger growth rates are possible in higher uniformity. In uniformity k 4, we prove that for any constant C>0, there exists a linear k-uniform hypergraph H for which r(H,Kn(k)) ≥ twrk-2(2( n)C).
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