A Note on Large Degenerate Induced Subgraphs in Sparse Graphs
Abstract
Given a graph G and a non-negative integer d let αd(G) be the order of a largest induced d-degenerate subgraph of G. We prove that for any pair of non-negative integers k>d, if G is a k-degenerate graph, then αd(G) ≥ \ (d+1)nk+d+1, n - αk-d-1(G)\. For k-degenerate graphs this improves a more general lower bound of Alon, Kahn, and Seymour. By modifying our argument we obtain improved lower bound on αd(G) for graphs of bounded genus. This extends earlier work on degenerate subgraphs of planar graphs.
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