Planar anti-Ramsey numbers of matchings

Abstract

Given a positive integer n and a planar graph H, let Tn(H) be the family of all plane triangulations T on n vertices such that T contains a subgraph isomorphic to H. The planar anti-Ramsey number of H, denoted ar_P(n, H), is the maximum number of colors in an edge-coloring of a plane triangulation T∈ Tn(H) such that T contains no rainbow copy of H. In this paper we study planar anti-Ramsey numbers of matchings. For all t1, let Mt denote a matching of size t. We prove that for all t6 and n 3t-6, 2n+3t-15 ar_P(n, Mt) 2n+4t-14, which significantly improves the existing lower and upper bounds for ar_P(n, Mt). It seems that for each t6, the lower bound we obtained is the exact value of ar_P(n, Mt) for sufficiently large n. This is indeed the case for M6. We prove that ar_P(n, M6)=2n+3 for all n30.