Hypergraph Ramsey numbers of cliques versus stars

Abstract

Let Km(3) denote the complete 3-uniform hypergraph on m vertices and Sn(3) the 3-uniform hypergraph on n+1 vertices consisting of all n2 edges incident to a given vertex. Whereas many hypergraph Ramsey numbers grow either at most polynomially or at least exponentially, we show that the off-diagonal Ramsey number r(K4(3),Sn(3)) exhibits an unusual intermediate growth rate, namely, \[ 2c 2 n r(K4(3),Sn(3)) 2c' n2/3 n \] for some positive constants c and c'. The proof of these bounds brings in a novel Ramsey problem on grid graphs which may be of independent interest: what is the minimum N such that any 2-edge-coloring of the Cartesian product KN KN contains either a red rectangle or a blue Kn?