Anti-Ramsey number of matchings in r-partite r-uniform hypergraphs

Abstract

An edge-colored hypergraph is rainbow if all of its edges have different colors. Given two hypergraphs H and G, the anti-Ramsey number ar(G, H) of H in G is the maximum number of colors needed to color the edges of G so that there does not exist a rainbow copy of H. Li et al. determined the anti-Ramsey number of k-matchings in complete bipartite graphs. Jin and Zang showed the uniqueness of the extremal coloring. In this paper, as a generalization of these results, we determine the anti-Ramsey number arr(Kn1,…,nr,Mk) of k-matchings in complete r-partite r-uniform hypergraphs and show the uniqueness of the extremal coloring. Also, we show that Kk-1,n2,…,nr is the unique extremal hypergraph for Tur\'an number exr(Kn1,…,nr,Mk) and show that arr(Kn1,…,nr, Mk)=exr(Kn1,…,nr,Mk-1)+1, which gives a multi-partite version result of \"Ozkahya and Young's conjecture.