Majority C-coloring of graphs

Abstract

Inspired by the majority colorings and C-colorings, we introduce and study the majority C-coloring of graphs. In such a vertex coloring, every vertex shares its color with at least half of its neighbors. The maximum number of colors that can be used in a majority C-coloring of a graph G is called the majority C-chromatic number and denoted by (G). An upper bound on (G) is proved in terms of the order, minimum, and maximum degree. Its sharpness is demonstrated by several results over different graph classes. In particular, (Pnk)= (Cnk)= n/(k+1) is true for the k-th power of a path and a cycle if n k+1. Further, (G) = (n-d)/3 holds if G is a (claw, K4)-free cubic graph and contains d diamonds. %claw-free cubic graph on n 6 vertices and contains d diamonds. It is further shown that the majority C-chromatic number is not monotone under edge deletion. In fact, both the lower and upper bounds are sharp in the inequality chain (G)-2 ≤ (G-e) ≤ (G) +1. The minimum and maximum number of edges in an n-vertex graph G with (G)=k are determined for every n and k. It is also pointed out that the classical chromatic number (G) and (G) are incomparable, and the difference (G)-(G) can take any positive or negative integer. On the other hand, (G)+(G) ≤ n+1 holds for every graph G of order n. The decision problem of whether (G) k holds is NP-complete for every fixed k 2. In contrast, some sufficient conditions for (G) 2 are proved, and a linear-time algorithm is presented that determines (T) if T is a tree.