Gallai-Ramsey numbers of C10 and C12

Abstract

A Gallai coloring is a coloring of the edges of a complete graph without rainbow triangles, and a Gallai k-coloring is a Gallai coloring that uses k colors. Given an integer k1 and graphs H1, …, Hk, the Gallai-Ramsey number GR(H1, …, Hk) is the least integer n such that every Gallai k-coloring of the complete graph Kn contains a monochromatic copy of Hi in color i for some i ∈ \1, …, k\. When H = H1 = ·s = Hk, we simply write GRk(H). We continue to study Gallai-Ramsey numbers of even cycles and paths. For all n3 and k1, let Gi=P2i+3 be a path on 2i+3 vertices for all i∈\0,1, …, n-2\ and Gn-1∈\C2n, P2n+1\. Let ij∈\0,1,…, n-1\ for all j∈\1, …, k\ with i1 i2·s ik . Song recently conjectured that GR(Gi1, …, Gik) = 3+\i1, n*-2\+Σj=1k ij, where n* =n when Gi1 P2n+1 and n* =n+1 when Gi1= P2n+1. This conjecture has been verified to be true for n∈\3,4\ and all k1. In this paper, we prove that the aforementioned conjecture holds for n ∈\5, 6\ and all k 1. Our result implies that for all k 1, GRk(C2n) = GRk(P2n) = (n-1)k+n+1 for n∈\5,6\ and GRk(P2n+1)= (n-1)k+n+2 for 1 n 6 .