A method for generating uniformly distributed points on \(N\)-dimensional spheres
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Publication:1131446
DOI10.1007/BF02868626zbMath0112.11203MaRDI QIDQ1131446
Publication date: 1962
Published in: Annals of the Institute of Statistical Mathematics (Search for Journal in Brave)
Related Items (14)
Allgemeiner Bericht über Monte-Carlo-Methoden ⋮ On generation of elliptical distributions with Gaussian form covariance matrix ⋮ Power of Tests of Uniformity Defined on the Hypersphere ⋮ Comparison of tests of uniformity defined on the hypersphere ⋮ On decompositional algorithms for uniform sampling from \(n\)-spheres and \(n\)-balls ⋮ A deterministic algorithm to compute approximate roots of polynomial systems in polynomial average time ⋮ On methods for generating uniform random points on the surface of a sphere ⋮ Conditioning using conditional expectations: the Borel-Kolmogorov paradox ⋮ The equal spacing of \(N\) points on a sphere with application to partition-of-unity wave diffraction problems ⋮ On the tangent model for the density of lines and a Monte Carlo method for computing hypersurface area ⋮ Statistics of energy partitions for many-particle systems in arbitrary dimension ⋮ A supplement to sowey's bibliography on random number generation and related topics ⋮ A supplement to sowey's bibliography on random number generation and related topics ⋮ An algorithm for uniform random sampling of points in and on a hypersphere
Cites Work
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- Some evaluations for continuous Monte Carlo method by using Brownian hitting process
- Some Continuous Monte Carlo Methods for the Dirichlet Problem
- An efficient method for generating uniformly distributed points on the surface of an n -dimensional sphere
- A note on a method for generating points uniformly on n -dimensional spheres
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