• Title of article

    A note on the computational complexity of graph vertex partition

  • Author/Authors

    Yuanqiu Huang، نويسنده , , Yuming Chu، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2007
  • Pages
    5
  • From page
    405
  • To page
    409
  • Abstract
    A stable set of a graph is a vertex set in which any two vertices are not adjacent. It was proven in [A. Brandstädt, V.B. Le, T. Szymczak, The complexity of some problems related to graph 3-colorability, Discrete Appl. Math. 89 (1998) 59–73] that the following problem is NP-complete: Given a bipartite graph G, check whether G has a stable set S such that image is a tree. In this paper we prove the following problem is polynomially solvable: Given a graph G with maximum degree 3 and containing no vertices of degree 2, check whether G has a stable set S such that image is a tree. Thus we partly answer a question posed by the authors in the above paper. Moreover, we give some structural characterizations for a graph G with maximum degree 3 that has a stable set S such that image is a tree.
  • Keywords
    Graph partition , Polynomial algorithm , Deficiency number , Stable set , Xuong tree
  • Journal title
    Discrete Applied Mathematics
  • Serial Year
    2007
  • Journal title
    Discrete Applied Mathematics
  • Record number

    886428