Given a graph $G$, a decomposition of $G$ is a partition of its edges. A graph is $(d, h)$-decomposable if its edge set can be partitioned into a $d$-degenerate graph and a graph with maximum degree at most $h$. For $d le 4$, we are interested in the minimum integer $h_d$ such that every planar graph is $(d,h_d)$-decomposable. It was known that $h_3 le 4$, $h_2le 8$, and $h_1 = infty$. This paper proves that $h_4=1, h_3=2$, and $4 le h_2 le 6$.
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