• Title of article

    splitting number is NP-complete Original Research Article

  • Author/Authors

    L. Faria، نويسنده , , C.M.H. de Figueiredo، نويسنده , , C.F.X. Mendonça، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2001
  • Pages
    19
  • From page
    65
  • To page
    83
  • Abstract
    We consider two graph invariants that are used as a measure of nonplanarity: the splitting number of a graph and the size of a maximum planar subgraph. The splitting number of a graph G is the smallest integer k⩾0, such that a planar graph can be obtained from G by k splitting operations. Such operation replaces a vertex v by two nonadjacent vertices v1 and v2, and attaches the neighbors of v either to v1 or to v2. We prove that the splitting number decision problem is NP-complete when restricted to cubic graphs. We obtain as a consequence that planar subgraph remains NP-complete when restricted to cubic graphs. Note that NP-completeness for cubic graphs implies NP-completeness for graphs not containing a subdivision of K5 as a subgraph.
  • Keywords
    Nonplanarity parameters , Topological graph theory , Computational complexity
  • Journal title
    Discrete Applied Mathematics
  • Serial Year
    2001
  • Journal title
    Discrete Applied Mathematics
  • Record number

    885156