The r-Dynamic Chromatic Number is Bounded in the Strong 2-Coloring Number
Abstract
A proper vertex-coloring of a graph is r-dynamic if the neighbors of each vertex v receive at least (r, deg(v)) different colors. In this note, we prove that if G has a strong 2-coloring number at most k, then G admits an r-dynamic coloring with no more than (k-1)r+1 colors. As a consequence, for every class of graphs of bounded expansion, the r-dynamic chromatic number is bounded by a linear function in r. We give a concrete upper bound for graphs of bounded row-treewidth, which includes for example all planar graphs.
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