2-Distance coloring of planar graphs without adjacent 5-cycles

The k-2-distance coloring of graph G is a mapping $$c:V(G)\rightarrow \{1,2,\ldots ,k\}$$ c : V ( G ) → { 1 , 2 , … , k } such that any two vertices at distance at most two from each other get different colors. The 2-distance chromatic number is the smallest integer k such that G has a k-2-distance coloring, denoted by $$\chi _{2}(G)$$ χ 2 ( G ) . In this paper, we prove that every planar graph G without adjacent 5-cycles and $$g(G)\ge 5$$ g ( G ) ≥ 5 and $$\Delta (G)\ge 17$$ Δ ( G ) ≥ 17 has $$\chi _{2}(G)\le \Delta +3$$ χ 2 ( G ) ≤ Δ + 3 .