New results on the odd- and unique-Ramsey numbers

Abstract

The odd-Ramsey number rodd(n,H) of a graph H is the minimum number of colors needed to edge-color Kn so that in every copy of H some color occurs an odd number of times, and the unique-Ramsey number ru(n,H) is the corresponding notion in which some color is required to occur not only an odd number of times but exactly once. In this paper, we address three questions from previous papers. We show rodd(n,Ks,t)> n1/( s2+ 12 t/8 ) when s≤ t and s is odd and t is even, which is log-asymptotically tight when s is fixed and t∞. Next, we consider the odd-Ramsey number when the host graph to be edge-colored is a super-Dirac graph, and show that in any host graph with minimum degree at least n/2+2, the odd-Ramsey number of Hamilton cycles is non-trivial. Finally, we show that ru(n,Cn)> n/4, which leads to a polynomial gap between rodd(n,Cn) and ru(n,Cn).