List 2-distance coloring of planar graphs

The $$2$$ 2 -distance coloring of a graph $$G$$ G is to color the vertices of $$G$$ G so that every two vertices at distance at most $$2$$ 2 from each other get different colors. Let $$\chi _{2}^{l}(G)$$ χ 2 l ( G ) be the list 2-distance chromatic number of $$G$$ G . In this paper, we show that (1) a planar graph $$G$$ G with $$\Delta (G)\ge 12$$ Δ ( G ) ≥ 12 which contains no $$3,5$$ 3 , 5 -cycles and intersecting 4-cycles has $$\chi _{2}^{l}(G)\le \Delta +6$$ χ 2 l ( G ) ≤ Δ + 6 ; (2) a planar graph $$G$$ G with $$\Delta (G)\le 5$$ Δ ( G ) ≤ 5 and $$g(G)\ge 5$$ g ( G ) ≥ 5 has $$\chi _{2}^{l}(G)\le 13$$ χ 2 l ( G ) ≤ 13 .