Simultaneous coloring of vertices and incidences of graphs
Abstract
An n-subdivision of a graph G is a graph constructed by replacing a path of length n instead of each edge of G and an m-power of G is a graph with the same vertices as G and any two vertices of G at distance at most m are adjacent. The graph Gmn is the m-power of the n-subdivision of G. In [M. N. Iradmusa, M. Mozafari-Nia, A note on coloring of 33-power of subquartic graphs, Vol. 79, No.3, 2021] it was conjectured that the chromatic number of 33-power of graphs with maximum degree ≥ 2 is at most 2+1. In this paper, we introduce the simultaneous coloring of vertices and incidences of graphs and show that the minimum number of colors for simultaneous proper coloring of vertices and incidences of G, denoted by vi(G), is equal to the chromatic number of G33. Also by determining the exact value or the upper bound for the said parameter, we investigate the correctness of the conjecture for some classes of graphs such as k-degenerated graphs, cycles, forests, complete graphs, and regular bipartite graphs. In addition, we investigate the relationship between this new chromatic number and the other parameters of graphs.
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