Stability for the Anti-Ramsey Number of Matchings

Abstract

Let n, r, s be three positive integers such that n≥ 2s+5. Let Kr denote the complete graph of order r. Given a graph F, the anti-Ramsey number ar(n,F) is defined as the minimum number C such that any edge-coloring of Kn with exactly C colors contains a rainbow copy of F. Let H be an edge-colored graph on Kn with at least g(n,s) colors, where \[ g(n,s)=\ n2 - n - s + 12 + 5, 2s - 12 + n + 1 \. \] In this paper, we establish a stability type result for the anti-Ramsey number of matchings. Specifically, if H does not have a rainbow matching of size s+2, then H contains either a monochromatic complete graph Kn-s or a monochromatic Kn - 2s - 1 K2s + 1.