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1 results

  • Buffon’s problem determines Gaussian curvature in three geometries

  • Part of
  • Aizelle Abelgas, Bryan Carrillo, John Palacios, David Weisbart, Adam M. Yassine
  • Journal:
    Journal of Applied Probability / Volume 61 / Issue 4 / December 2024
    Published online by Cambridge University Press:
    08 April 2024, pp. 1127-1138
    Print publication:
    December 2024
    • Article
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  • A version of the classical Buffon problem in the plane naturally extends to the setting of any Riemannian surface with constant Gaussian curvature. The Buffon probability determines a Buffon deficit. The relationship between Gaussian curvature and the Buffon deficit is similar to the relationship that the Bertrand–Diguet–Puiseux theorem establishes between Gaussian curvature and both circumference and area deficits.