• Title of article

    On the Carathéodory Number for the Convexity of Paths of Order Three

  • Author/Authors

    Barbosa، نويسنده , , Rommel M. and Coelho، نويسنده , , Erika M.M. and Dourado، نويسنده , , Mitre C. and Rautenbach، نويسنده , , Dieter and Szwarcfiter، نويسنده , , Jayme L.، نويسنده ,

  • Issue Information
    روزنامه با شماره پیاپی سال 2011
  • Pages
    6
  • From page
    105
  • To page
    110
  • Abstract
    Let G be a finite, simple, and undirected graph and let S be a set of vertices of G. If no vertex of G that does not belong to S has two neighbours in S, then S is P 3 -convex. The P 3 -convex hull H G ( S ) of S is the smallest P 3 -convex set containing S. The P 3 -Carathéodory number of G is the smallest integer c such that for every set S and every vertex u in H G ( S ) , there is a set F ⊆ S with | F | ⩽ c and u ∈ H G ( F ) . dy structural and algorithmic aspects of the P 3 -Carathéodory number. We characterize the P 3 -Carathéodory number of trees and block graphs, establish upper bounds on the P 3 -Carathéodory number of general graphs and of claw-free graphs and prove that it is NP-complete to decide for a given bipartite graph G and a given integer k, whether the P 3 -Carathéodory number of G is at least k.
  • Keywords
    Convexity space , geodetic convexity , graph , monophonic convexity , Carathéodory number , P 3 convexity
  • Journal title
    Electronic Notes in Discrete Mathematics
  • Serial Year
    2011
  • Journal title
    Electronic Notes in Discrete Mathematics
  • Record number

    1455776