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  • BISECTORS IN VECTOR GROUPS OVER INTEGERS

  • Part of
  • SHENG BAU, YIMING LEI
  • Journal:
    Bulletin of the Australian Mathematical Society / Volume 100 / Issue 3 / December 2019
    Published online by Cambridge University Press:
    15 August 2019, pp. 353-361
    Print publication:
    December 2019
    • Article
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  • We present an example of an isometric subspace of a metric space that has a greater metric dimension. We also show that the metric spaces of vector groups over the integers, defined by the generating set of unit vectors, cannot be resolved by a finite set. Bisectors in the spaces of vector groups, defined by the generating set consisting of unit vectors, are completely determined.