The anti-Ramsey number of C3 and C4 in the complete r-partite graphs

Abstract

A subgraph of an edge-colored graph is rainbow, if all of its edges have different colors. For a graph G and a family H of graphs, the anti-Ramsey number ar(G, H) is the maximum number k such that there exists an edge-coloring of G with exactly k colors without rainbow copy of any graph in H. In this paper, we study the anti-Ramsey number of C3 and C4 in the complete r-partite graphs. For r 3 and n1 n2 ·s nr 1, we determine ar(Kn1, n2, …, nr,\C3, C4\), ar(Kn1, n2, …, nr, C3) and ar(Kn1, n2, …, nr, C4).