On Some Three-Color Ramsey Numbers for Paths

Abstract

For graphs G1, G2, G3, the three-color Ramsey number R(G1, G2, G3) is the smallest integer n such that if we arbitrarily color the edges of the complete graph of order n with 3 colors, then it contains a monochromatic copy of Gi in color i, for some 1 ≤ i ≤ 3. First, we prove that the conjectured equality R3(C2n,C2n,C2n)=4n, if true, implies that R3(P2n+1,P2n+1,P2n+1)=4n+1 for all n 3. We also obtain two new exact values R(P8,P8,P8)=14 and R(P9,P9,P9)=17, furthermore we do so without help of computer algorithms. Our results agree with a formula R(Pn,Pn,Pn)=2n-2+(n 2) which was proved for sufficiently large n by Gy\'arf\'as, Ruszink\'o, S\'ark\"ozy, and Szemer\'edi in 2007. This provides more evidence for the conjecture that the latter holds for all n 1.