Anti-Ramsey numbers of loose paths and cycles in uniform hypergraphs

Abstract

For a fixed family of r-uniform hypergraphs F, the anti-Ramsey number of F, denoted by ar(n,r,F), is the minimum number c of colors such that for any edge-coloring of the complete r-uniform hypergraph on n vertices with at least c colors, there is a rainbow copy of some hypergraph in F. Here, a rainbow hypergraph is an edge-colored hypergraph with all edges colored differently. Let Pk and Ck be the families of loose paths and loose cycles with k edges in an r-uniform hypergraph, respectively. In this paper, we determine the exact values of ar(n,r,Pk) and ar(n,r,Ck) for all k≥ 4 and r≥ 3.

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