• Title of article

    Snarks and Flow-Critical Graphs

  • Author/Authors

    da Silva، نويسنده , , Cândida Nunes and Pesci، نويسنده , , Lissa and Lucchesi، نويسنده , , Clلudio L.، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2013
  • Pages
    7
  • From page
    299
  • To page
    305
  • Abstract
    It is well-known that a 2-edge-connected cubic graph has a 3-edge-colouring if and only if it has a 4-flow. Snarks are usually regarded to be, in some sense, the minimal cubic graphs without a 3-edge-colouring. We defined the notion of 4-flow-critical graphs as an alternative concept towards minimal graphs. It turns out that every snark has a 4-flow-critical snark as a minor. We verify, surprisingly, that less than 5% of the snarks with up to 28 vertices are 4-flow-critical. On the other hand, there are infinitely many 4-flow-critical snarks, as every flower-snark is 4-flow-critical. These observations give some insight into a new research approach regarding Tutteʼs Flow Conjectures.
  • Keywords
    nowhere-zero k-flows , 3-edge-colouring , flow-critical graphs , Tutte?s Flow Conjectures
  • Journal title
    Electronic Notes in Discrete Mathematics
  • Serial Year
    2013
  • Journal title
    Electronic Notes in Discrete Mathematics
  • Record number

    1456470