New Bounds on the Anti-Ramsey Number of Independent Triangles

Abstract

An edge-colored graph is called rainbow graph if all the colors on its edges are distinct. Given a positive integer n and a graph G, the anti-Ramsey number ar(n,G) is defined to be the minimum number of colors r such that there exists a rainbow copy of G in any exactly r-edge-coloring of Kn. Wu et al. (Anti-Ramsey numbers for vertex-disjoint triangles, Discrete. Math., 346 (2022), 113123) determined the anti-Ramsey number ar(n, kK3) for n≥ 2k2-k+2 . In this paper, we extend this result by improving the lower bound on n to n≥ 15k+57.