3 research outputs found
Planar graphs without normally adjacent short cycles
Let be the class of plane graphs without triangles normally
adjacent to -cycles, without -cycles normally adjacent to
-cycles, and without normally adjacent -cycles. In this paper, it is
showed that every graph in is -choosable. Instead of proving
this result, we directly prove a stronger result in the form of "weakly"
DP--coloring. The main theorem improves the results in [J. Combin. Theory
Ser. B 129 (2018) 38--54; European J. Combin. 82 (2019) 102995]. Consequently,
every planar graph without -, -, -cycles is -choosable, and every
planar graph without -, -, -, -cycles is -choosable. In the
third section, it is proved that the vertex set of every graph in
can be partitioned into an independent set and a set that induces a forest,
which strengthens the result in [Discrete Appl. Math. 284 (2020) 626--630]. In
the final section, tightness is considered.Comment: 19 pages, 3 figures. The result is strengthened, and a new result is
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