Abstract
We show that every graph has an induced pseudoforest of at least n-m/4.5 vertices, an induced partial 2-tree of at least n-m/5 vertices, and an induced planar subgraph of at least n-m/5.2174 vertices. These results are constructive, implying linear-time algorithms to find the respective induced subgraphs. We also show that the size of the largest K h -minor-free graph in a given graph can sometimes be at most n-m/6+om.
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