Every planar graph without i-cycles adjacent simultaneously to j-cycles and k-cycles is DP-4-colorable when \i,j,k\=\3,4,5\

Abstract

DP-coloring is a generalization of a list coloring in simple graphs. Many results in list coloring can be generalized in those of DP-coloring. Kim and Ozeki showed that planar graphs without k-cycles where k=3,4,5, or 6 are DP-4-colorable. Recently, Kim and Yu extended the result on 3- and 4-cycles by showing that planar graphs without triangles adjacent to 4-cycles are DP-4-colorable. Xu and Wu showed that planar graphs without 5-cycles adjacent simultaneously to 3-cycles and 4-cycles are 4-choosable. In this paper, we extend the result on 5-cycles and triangles adjacent to 4-cycles by showing that planar graphs without i-cycles adjacent simultaneously to j-cycles and k-cycles are DP-4-colorable when \i,j,k\=\3,4,5\. This also generalizes the result of Xu and Wu.