An extremal problem in proper (r,p)-coloring of hypergraphs

Abstract

Let G(V,E) be a k-uniform hypergraph. A hyperedge e ∈ E is said to be properly (r,p) colored by an r-coloring of vertices in V if e contains vertices of at least p distinct colors in the r-coloring. An r-coloring of vertices in V is called a strong (r,p) coloring if every hyperedge e ∈ E is properly (r,p) colored by the r-coloring. We study the maximum number of hyperedges that can be properly (r,p) colored by a single r-coloring and the structures that maximizes number of properly (r,p) colored hyperedges.