On the size-Ramsey number of tight paths

Abstract

For any r≥ 2 and k≥ 3, the r-color size-Ramsey number R(G,r) of a k-uniform hypergraph G is the smallest integer m such that there exists a k-uniform hypergraph H on m edges such that any coloring of the edges of H with r colors yields a monochromatic copy of G. Let Pn,k-1(k) denote the k-uniform tight path on n vertices. Dudek, Fleur, Mubayi and Rodl showed that the size-Ramsey number of tight paths R(Pn,k-1(k), 2) = O(nk-1-α ( n)1+α) where α = k-2k-12+1. In this paper, we improve their bound by showing that R(Pn,k-1(k), r) = O(rk (n n)k/2) for all k≥ 3 and r≥ 2.