Some conditions on 5-cycles that make planar graphs 4-choosable
Abstract
Consider two conditions on a graph: (1) each 5-cycle is not a subgraph of 5-wheel and does not share exactly one edge with 3-cycle, and (2) each 5-cycle is not adjacent to two 3-cycles and is not adjacent to a 4-cycle with chord. We show that if a planar graph G satisfies one of the these conditions, then G is 4-choosable. This yields that if each 5-cycle of a planar graph G is not adjacent a 3-cycle, then G is 4-choosable.
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