Research article

Solution of the Chen-Chvátal conjecture for specific classes of metric spaces

  • Received: 25 March 2021 Accepted: 13 May 2021 Published: 17 May 2021
  • MSC : Primary 30L99; secondary 05C76

  • In a metric space $ (X, d) $, a line induced by two distinct points $ x, x'\in X $, denoted by $ \mathcal{L}\{x, x'\} $, is the set of points given by

    $ \mathcal{L}\{x, x'\} = \{z\in X:\, d(x, x') = d(x, z)+d(z, x') \text{ or }d(x, x') = |d(x, z)-d(z, x')|\}. $

    A line $ \mathcal{L}\{x, x'\} $ is universal whenever $ \mathcal{L}\{x, x'\} = X $.

    Chen and Chvátal [Discrete Appl. Math. 156 (2008), 2101-2108.] conjectured that every finite metric space on $ n\ge 2 $ points either has at least $ n $ distinct lines or has a universal line.

    In this paper, we prove this conjecture for some classes of metric spaces. In particular, we discuss the classes of Cartesian metric spaces, lexicographic metric spaces and corona metric spaces.

    Citation: Juan Alberto Rodríguez-Velázquez. Solution of the Chen-Chvátal conjecture for specific classes of metric spaces[J]. AIMS Mathematics, 2021, 6(7): 7766-7781. doi: 10.3934/math.2021452

    Related Papers:

  • In a metric space $ (X, d) $, a line induced by two distinct points $ x, x'\in X $, denoted by $ \mathcal{L}\{x, x'\} $, is the set of points given by

    $ \mathcal{L}\{x, x'\} = \{z\in X:\, d(x, x') = d(x, z)+d(z, x') \text{ or }d(x, x') = |d(x, z)-d(z, x')|\}. $

    A line $ \mathcal{L}\{x, x'\} $ is universal whenever $ \mathcal{L}\{x, x'\} = X $.

    Chen and Chvátal [Discrete Appl. Math. 156 (2008), 2101-2108.] conjectured that every finite metric space on $ n\ge 2 $ points either has at least $ n $ distinct lines or has a universal line.

    In this paper, we prove this conjecture for some classes of metric spaces. In particular, we discuss the classes of Cartesian metric spaces, lexicographic metric spaces and corona metric spaces.



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    [15] M. Ó Searcóid, Metric spaces, Springer Undergraduate Mathematics Series, Springer-Verlag London, Ltd., London, 2007.
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