DAG-Width and Circumference of Digraphs

Jørgen Bang-Jensen, Tilde My Larsen

    Research output: Contribution to journalJournal articleResearchpeer-review

    Abstract

    We prove that every digraph of circumference l has DAG‐width at most l. This is best possible and solves a recent conjecture from S. Kintali (ArXiv:1401.2662v1 [math.CO], January 2014).1 As a consequence of this result we deduce that the k‐linkage problem is polynomially solvable for every fixed k in the class of digraphs with bounded circumference. This answers a question posed in J. Bang‐Jensen, F. Havet, and A. K. Maia (Theor Comput Sci 562 (2014), 283–303). We also prove that the weak k‐linkage problem (where we ask for arc‐disjoint paths) is polynomially solvable for every fixed k in the class of digraphs with circumference 2 as well as for digraphs with a bounded number of disjoint cycles each of length at least 3. The case of bounded circumference digraphs is still open. Finally, we prove that the minimum spanning strong subdigraph problem is NP‐hard on digraphs of DAG‐width at most 5.
    Original languageEnglish
    JournalJournal of Graph Theory
    Volume82
    Issue number2
    Pages (from-to)194-206
    ISSN0364-9024
    DOIs
    Publication statusPublished - 2016

    Keywords

    • DAG-width
    • bounded cycle length
    • cops-and-robbers game
    • k-linkage problem
    • polynomial algorithm

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