Planar graphs without cycles of lengths 4 and 5 and close triangles are DP-3-colorable

Abstract

Montassier, Raspaud, and Wang (2006) asked to find the smallest positive integers d0 and d1 such that planar graphs without \4,5\-cycles and d d0 are 3-choosable and planar graphs without \4,5,6\-cycles and d d1 are 3-choosable, where d is the smallest distance between triangles. They showed that 2 d0 4 and d1 3. In this paper, we show that the following planar graphs are DP-3-colorable: (1) planar graphs without \4,5\-cycles and d 3 are DP-3-colorable, and (2) planar graphs without \4,5,6\-cycles and d 2 are DP-3-colorable. DP-coloring is a generalization of list-coloring, thus as a corollary, d0 3 and d1 2. We actually prove stronger statements that each pre-coloring on some cycles can be extended to the whole graph.