An elliptically symmetric angular Gaussian distribution

P. J. Paine; S. P. Preston; M. Tsagris; Andrew T.A. Wood

doi:10.1007/s11222-017-9756-4

An elliptically symmetric angular Gaussian distribution

P. J. Paine
, S. P. Preston^*
, M. Tsagris
, Andrew T.A. Wood

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

35 Citations (Scopus)

Abstract

We define a distribution on the unit sphere S^d^-¹ called the elliptically symmetric angular Gaussian distribution. This distribution, which to our knowledge has not been studied before, is a subfamily of the angular Gaussian distribution closely analogous to the Kent subfamily of the general Fisher–Bingham distribution. Like the Kent distribution, it has ellipse-like contours, enabling modelling of rotational asymmetry about the mean direction, but it has the additional advantages of being simple and fast to simulate from, and having a density and hence likelihood that is easy and very quick to compute exactly. These advantages are especially beneficial for computationally intensive statistical methods, one example of which is a parametric bootstrap procedure for inference for the directional mean that we describe.

Original language	English
Pages (from-to)	689-697
Number of pages	9
Journal	Statistics and Computing
Volume	28
Issue number	3
DOIs	https://doi.org/10.1007/s11222-017-9756-4
Publication status	Published - 1 May 2018
Externally published	Yes

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title = "An elliptically symmetric angular Gaussian distribution",

abstract = "We define a distribution on the unit sphere Sd-1 called the elliptically symmetric angular Gaussian distribution. This distribution, which to our knowledge has not been studied before, is a subfamily of the angular Gaussian distribution closely analogous to the Kent subfamily of the general Fisher–Bingham distribution. Like the Kent distribution, it has ellipse-like contours, enabling modelling of rotational asymmetry about the mean direction, but it has the additional advantages of being simple and fast to simulate from, and having a density and hence likelihood that is easy and very quick to compute exactly. These advantages are especially beneficial for computationally intensive statistical methods, one example of which is a parametric bootstrap procedure for inference for the directional mean that we describe.",

keywords = "Angular Gaussian, Bootstrap, Kent distribution, Spherical distribution",

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doi = "10.1007/s11222-017-9756-4",

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AU - Paine, P. J.

AU - Preston, S. P.

AU - Tsagris, M.

AU - Wood, Andrew T.A.

PY - 2018/5/1

Y1 - 2018/5/1

N2 - We define a distribution on the unit sphere Sd-1 called the elliptically symmetric angular Gaussian distribution. This distribution, which to our knowledge has not been studied before, is a subfamily of the angular Gaussian distribution closely analogous to the Kent subfamily of the general Fisher–Bingham distribution. Like the Kent distribution, it has ellipse-like contours, enabling modelling of rotational asymmetry about the mean direction, but it has the additional advantages of being simple and fast to simulate from, and having a density and hence likelihood that is easy and very quick to compute exactly. These advantages are especially beneficial for computationally intensive statistical methods, one example of which is a parametric bootstrap procedure for inference for the directional mean that we describe.

AB - We define a distribution on the unit sphere Sd-1 called the elliptically symmetric angular Gaussian distribution. This distribution, which to our knowledge has not been studied before, is a subfamily of the angular Gaussian distribution closely analogous to the Kent subfamily of the general Fisher–Bingham distribution. Like the Kent distribution, it has ellipse-like contours, enabling modelling of rotational asymmetry about the mean direction, but it has the additional advantages of being simple and fast to simulate from, and having a density and hence likelihood that is easy and very quick to compute exactly. These advantages are especially beneficial for computationally intensive statistical methods, one example of which is a parametric bootstrap procedure for inference for the directional mean that we describe.

KW - Angular Gaussian

KW - Bootstrap

KW - Kent distribution

KW - Spherical distribution

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SN - 0960-3174

VL - 28

SP - 689

EP - 697

JO - Statistics and Computing

JF - Statistics and Computing

IS - 3

ER -

An elliptically symmetric angular Gaussian distribution

Abstract

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