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Inapplicability of Asymptotic Results on the Minimal Spanning Tree in Statistical Testing

✍ Scribed by C. Caroni; P. Prescott

Publisher
Elsevier Science
Year
2002
Tongue
English
Weight
62 KB
Volume
83
Category
Article
ISSN
0047-259X

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✦ Synopsis

Penrose has given asymptotic results for the distribution of the longest edge of the minimal spanning tree and nearest neighbour graph for sets of multivariate uniformly or normally distributed points. We investigate the applicability of these results to samples of up to 100 points, in up to 10 dimensions. We conclude that the asymptotic results provide an acceptable approximation only in the uniform case. Their inaccuracy for the multivariate normal case means that they cannot be applied to improve Rohlf's gap test for an outlier in a set of multivariate data points, which depends on the longest edge of the minimal spanning tree of the set.

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The following asymptotic estimation of the maximum number of spanning trees f k (n) in 2kregular circulant graphs ( k ΓΊ 1) on n vertices is the main result of this paper: )) , where