Coloring triangles in graphs

Abstract

We study quantitative aspects of the following fact: For every graph F, there exists a graph G with the property that any 2-coloring of the triangles of G yields an induced copy of F, in which all triangles are monochromatic. We define the Ramsey number Rind(F) as the smallest size of such a graph G. Although this fact has several proofs, all of them provide tower-type bounds. We study the number Rind(F) for some particular classes of graphs F.

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