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1 results

  • Hypergroups associated to harmonic NA groups

  • Part of
  • Bianca Di Blasio
  • Journal:
    Journal of the Australian Mathematical Society / Volume 72 / Issue 2 / April 2002
    Published online by Cambridge University Press:
    09 April 2009, pp. 209-216
    Print publication:
    April 2002
    • Article
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  • A harmonic NA group is a suitable solvable extension of a two-step nilpotent Lie group N of Heisenberg type by R+, which acts on N by anisotropic dilations. A hypergroup is a locally compact space for which the space of Borel measures has a convolution structure preserving the probability measures and satisfying suitable conditions. We describe a class of hypergroups associated to NA groups.