Partitioning sparse graphs into an independent set and a forest of bounded degree
Abstract
An ( I, Fd)-partition of a graph is a partition of the vertices of the graph into two sets I and F, such that I is an independent set and F induces a forest of maximum degree at most d. We show that for all M<3 and d 23-M - 2, if a graph has maximum average degree less than M, then it has an ( I, Fd)-partition. Additionally, we prove that for all 83 M < 3 and d 13-M, if a graph has maximum average degree less than M then it has an ( I, Fd)-partition.
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