Ramsey number of a connected triangle matching

Abstract

We determine the 2-color Ramsey number of a connected triangle matching c(nK3) which is any connected graph containing n vertex disjoint triangles. We obtain that R(c(nK3),c(nK3))=7n-2, somewhat larger than in the classical result of Burr, Erd os and Spencer for a triangle matching, R(nK3,nK3)=5n. The motivation is to determine the Ramsey number R(Cn2,Cn2) of the square of a cycle Cn2. We apply our Ramsey result for connected triangle matchings to show that the Ramsey number of an "almost" square of a cycle Cn2,c (a cycle of length n in which all but at most a constant number c of short diagonals are present) is asymptotic to 7n/3.