Partitioning into degenerate graphs in linear time
Abstract
Let G be a connected graph with maximum degree ≥ 3 distinct from K + 1. Generalizing Brooks' Theorem, Borodin, Kostochka and Toft proved that if p1, …, ps are non-negative integers such that p1 + … + ps ≥ - s, then G admits a vertex partition into parts A1, …, As such that, for 1 ≤ i ≤ s, G[Ai] is pi-degenerate. Here we show that such a partition can be performed in linear time. This generalizes previous results that treated subcases of a conjecture of Abu-Khzam, Feghali and Heggernes~abu2020partitioning, which our result settles in full.
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