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1 results

  • Long induced paths in expanders

  • Part of
  • Nemanja Draganić, Peter Keevash
  • Journal:
    Combinatorics, Probability and Computing , First View
    Published online by Cambridge University Press:
    19 November 2024, pp. 1-7
    • Article
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  • We prove that any bounded degree regular graph with sufficiently strong spectral expansion contains an induced path of linear length. This is the first such result for expanders, strengthening an analogous result in the random setting by Draganić, Glock, and Krivelevich. More generally, we find long induced paths in sparse graphs that satisfy a mild upper-uniformity edge-distribution condition.