Nearest neighbour analysis of random distributions on a sphere

D. Scott, Christopher A. Tout

Type: Article

Publication Date: 1989-11-01

Citations: 42

DOI: https://doi.org/10.1093/mnras/241.2.109

Abstract

The distribution of nearest neighbour separations of points placed randomly on the surface of a sphere is useful in deciding whether objects in real data are random or occur in pairs. In the past, a Poisson distribution has been used. We present a more natural spherical analysis of this problem, obtaining the probability distribution function and the mean separation of random points. We show that for a large number of points this distribution is equivalent to the Poisson form. We also extend it to give the 2nd and Mth nearest neighbor distributions. To illustrate the application to astronomical data, we consider the distribution of X-ray clusters, which are found to occur in pairs.

Locations

Monthly Notices of the Royal Astronomical Society - View - PDF

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