Induced Subgraphs of Bounded Degree and Bounded Treewidth

Abstract

We prove that for all 0≤ t≤ k and d≥ 2k, every graph G with treewidth at most k has a `large' induced subgraph H, where H has treewidth at most t and every vertex in H has degree at most d in G. The order of H depends on t, k, d, and the order of G. With t=k, we obtain large sets of bounded degree vertices. With t=0, we obtain large independent sets of bounded degree. In both these cases, our bounds on the order of H are tight. For bounded degree independent sets in trees, we characterise the extremal graphs. Finally, we prove that an interval graph with maximum clique size k has a maximum independent set in which every vertex has degree at most 2k.

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