Extremal Problems in Royal Colorings of Graphs

Abstract

An edge coloring c of a graph G is a royal k-edge coloring of G if the edges of G are assigned nonempty subsets of the set \1, 2, …, k\ in such a way that the vertex coloring obtained by assigning the union of the colors of the incident edges of each vertex is a proper vertex coloring. If the vertex coloring is vertex-distinguishing, then c is a strong royal k-edge coloring. The minimum positive integer k for which G has a strong royal k-edge coloring is the strong royal index of G. It has been conjectured that if G is a connected graph of order n 4 where 2k-1 n 2k-1 for a positive integer k, then the strong royal index of G is either k or k+1. We discuss this conjecture along with other information concerning strong royal colorings of graphs. A sufficient condition for such a graph to have a strong royal index k+1 is presented.