Vertex partitions of (C3,C4,C6)-free planar graphs
Abstract
A graph is (k1,k2)-colorable if its vertex set can be partitioned into a graph with maximum degree at most k1 and and a graph with maximum degree at most k2. We show that every (C3,C4,C6)-free planar graph is (0,6)-colorable. We also show that deciding whether a (C3,C4,C6)-free planar graph is (0,3)-colorable is NP-complete.
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