• Title of article

    On the metric dimension of rotationally-symmetric convex polytopes

  • Author/Authors

    Imran, Muhammad National University of Sciences and Technology (NUST) - School of Natural Sciences (SNS) - Department of Mathematics, Pakistan , Bokhary, Ahtsham Ul Haq Bahauddin Zakariya University - Centre for Advanced Studies in Pure and Applied Mathematics, Pakistan , Baig, A. Q. COMSATS Institute of Information Technology - Department of Mathematics, Pakistan

  • From page
    45
  • To page
    59
  • Abstract
    Metric dimension is a generalization of affine dimension to arbitrary metric spaces (provided a resolving set exists). Let F be a family of connected graphs G_n : F = (G_n)_n≥ 1 depending on n as follows: the order IV (G)I = Φ(n) and lim n→∞, Φ(n)= ∞. If there exists a constant C 0 such that dim_(Gn)≤ C for every n ≥ 1 then we shall say that F has bounded metric dimension, otherwise F has unbounded metric dimension. If all graphs in F have the same metric dimension, then F is called a family of graphs with constant metric dimension. In this paper, we study the metric dimension of some classes of convex polytopes which are rotationally-symmetric. It is shown that these classes of convex polytoes have the constant metric dimension and only three vertices chosen appropriately suffice to resolve all the vertices of these classes of convex polytopes. It is natural to ask for the characterization of classes of convex polytopes with constant metric dimension.
  • Keywords
    Metric dimension , Basis , Resolving set , Prism , Antiprism , Convex polytopes
  • Journal title
    Journal Of Algebra Combinatorics Discrete Structures an‎d Applications
  • Journal title
    Journal Of Algebra Combinatorics Discrete Structures an‎d Applications
  • Record number

    2650140