Strong majority colorings of graphs

Abstract

Motivated by majority vertex-colorings of graphs and digraphs and majority edge-colorings of graphs, we introduce two concepts of strong majority colorings. A strong majority vertex-coloring of a graph G=(V,E) is a mapping c:V→ C such that for every vertex v∈ V and every color α∈ C, at most half of the neighbors of v have color α. The strong majority number of G, denoted Maj(G), is the least number of colors in such a coloring. We show that Maj(G) can be arbitrarily large and prove a tight upper bound Maj(G) 2Δ(G)+1 for every graph G without pendant vertices. A strong majority edge-coloring of a graph G is a mapping c:E→ C such that for every edge e∈ E and every color α∈ C, at most half of the edges adjacent to e have color α. The strong majority index of G, denoted Maj'(G), is the least number of colors in such a coloring. It is shown that there is an upper constant bound for Maj'(G) of all admissible graphs G. We conjecture that this constant is as small as 4 and confirm this conjecture for numerous graph classes.