Pongpat Sittitrai, Kittikorn Nakprasit
Published 2017-09-14Version 1
Xu and Wu proved that if every $5$-cycle of a planar graph $G$ is not simultaneously adjacent to $3$-cycles and $4$-cycles, then $G$ is $4$-choosable. In this paper, we improve this result as follows. Let $\{i, j, k, l\} = \{3,4,5,6\}.$ For any chosen $i,$ if every $i$-cycle of a planar graph $G$ is not simultaneously adjacent to $j$-cycles, $k$-cycles, and $l$-cycles, then $G$ is $4$-choosable.
Planar graphs without pairwise adjacent 3-,4-,5-, and 6-cycle are 4-choosable
3-choosability of planar graphs with (<=4)-cycles far apart
$(3,1)^*$-choosability of planar graphs without adjacent short cycles
![QR code for arXiv:1709.04608 [math.CO]](http://oss.arxitics.com/images/favicon.svg)