Abstract
A dynamic coloring of a graph G is a proper coloring of the vertex set V (G) such that each vertex neighborhood of size at least 2 receives at least two distinct colors. The list dynamic chromatic number chd(G) of G is the least integer k such that for every list assignment of size k to each vertex of G, there is a dynamic coloring of G such that each vertex is colored by a color from its list. We proved that chd(G) ≤ 4 if Mad(G) < 8/3 where Mad(G) is the maximum average degree of G. And chd(G) ≤ 4 if G is a planar graph of girth at least 7. Both results are sharp. In addition, we show that chd(G) ≤ 6 for every planar graph G.
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