Planar graphs without 4-, 7-, 9-cycles and 5-cycles normally adjacent to 3-cycles

Abstract

A graph is (I, F)-partitionable if its vertex set can be partitioned into two parts such that one part I is an independent set, and the other F induces a forest. A graph is k-degenerate if every subgraph H contains a vertex of degree at most k in H. Bernshteyn and Lee defined a generalization of k-degenerate graphs, which is called weakly k-degenerate. In this paper, we show that planar graphs without 4-, 7-, 9-cycles, and 5-cycles normally adjacent to 3-cycles are both (I, F)-partitionable and weakly 2-degenerate.

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