The size-Ramsey number of cubic graphs
Abstract
We show that the size-Ramsey number of any cubic graph with n vertices is O(n8/5), improving a bound of n5/3 + o(1) due to Kohayakawa, R\"odl, Schacht, and Szemer\'edi. The heart of the argument is to show that there is a constant C such that a random graph with C n vertices where every edge is chosen independently with probability p ≥ C n-2/5 is with high probability Ramsey for any cubic graph with n vertices. This latter result is best possible up to the constant.
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