A heuristic proof of a long-standing conjecture of D. G. Kendall concerning the shapes of certain large random polygons
From MaRDI portal
Publication:4842263
DOI10.2307/1427833zbMath0829.60008OpenAlexW2331665827WikidataQ122927245 ScholiaQ122927245MaRDI QIDQ4842263
Publication date: 7 September 1995
Published in: Advances in Applied Probability (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2307/1427833
Related Items (13)
The limit shape of the zero cell in a stationary Poisson hyperplane tessellation. ⋮ Intrinsic correlation in planar Poisson line processes ⋮ Distance from the nucleus to a uniformly random point in the 0-cell and the typical cell of the Poisson-Voronoi tessellation ⋮ Small cells in a Poisson hyperplane tessellation ⋮ Short-length routes in low-cost networks via Poisson line patterns ⋮ Planar line processes for void and density statistics in thin stochastic fibre networks ⋮ Random line tessellations of the plane: Statistical properties of many-sided cells ⋮ Asymptotic shape of small cells ⋮ Large Poisson-Voronoi cells and Crofton cells ⋮ The scaling limit of Poisson-driven order statistics with applications in geometric probability ⋮ Proof of David Kendall's conjecture concerning the shape of large random polygons ⋮ On a conjecture of D. G. Kendall concerning the planar Crofton cell and on its Brownian counterpart ⋮ Unnamed Item
This page was built for publication: A heuristic proof of a long-standing conjecture of D. G. Kendall concerning the shapes of certain large random polygons
