Induced Cycles of Many Lengths
Abstract
Let G be a graph and let cl(G) be the number of distinct induced cycle lengths in G. We show that for c,t∈ N, every graph G that does not contain an induced subgraph isomorphic to Kt+1 or Kt,t and satisfies cl(G) c has bounded treewidth. As a consequence, we obtain a polynomial-time algorithm for deciding whether a graph G contains induced cycles of at least three distinct lengths.
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