A Selective Overview of Skew-Elliptical and Related Distributions and of Their Applications

Adcock, Chris; Azzalini, Adelchi

doi:10.3390/sym12010118

Cited by 37 publications

(12 citation statements)

References 210 publications

(301 reference statements)

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“…Its moments were derived in [47]. For further discussion on these distributions and their applications, see [32][33][34][35].…”

Section: Multivariate T and Skew-t Distributionsmentioning

confidence: 99%

“…We run a Monte Carlo simulation where 1000 samples of size n = 1000 are generated from the St 3 distribution defined above. For each of the 1000 samples, measures of location, variance, skewness and kurtosis are computed applying Formulae (34) and (35) and the results of Lemmas 3 and 4. Empirical averages of the statistics are calculated, denoting the empirical expected value as E.…”

Section: Figurementioning

confidence: 99%

“…[32] provides some specific analytical properties of skew-symmetric distributions. Further discussion on these distributions and their applications can be found in [33][34][35].…”

Section: Introductionmentioning

confidence: 99%

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Cumulants of Multivariate Symmetric and Skew Symmetric Distributions

2021

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“…Its moments were derived in [47]. For further discussion on these distributions and their applications, see [32][33][34][35].…”

Section: Multivariate T and Skew-t Distributionsmentioning

confidence: 99%

Section: Figurementioning

confidence: 99%

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Cumulants of Multivariate Symmetric and Skew Symmetric Distributions

2021

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“…The form of (3) represents a typical skewed elliptical distribution, of which Y 0 has also been extended to higher dimensions [17], [18], [19]. Importantly, the form of ( 3) is invariant under quadratic forms [9], and is closed under marginalisation and affine transforms; we refer to [20] for more detail. However, the estimation of the above skewed elliptical distributions can be ill-posed, especially regarding its shape (skewness) parameter.…”

Section: Existing Generalised Elliptical Distributionsmentioning

confidence: 99%

Von Mises-Fisher Elliptical Distribution

Li¹,

Mandic²

2021

Preprint

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A large class of modern probabilistic learning systems assumes symmetric distributions, however, real-world data tend to obey skewed distributions and are thus not always adequately modelled through symmetric distributions. To address this issue, elliptical distributions are increasingly used to generalise symmetric distributions, and further improvements to skewed elliptical distributions have recently attracted much attention. However, existing approaches are either hard to estimate or have complicated and abstract representations. To this end, we propose to employ the von-Mises-Fisher (vMF) distribution to obtain an explicit and simple probability representation of the skewed elliptical distribution. This is shown not only to allow us to deal with non-symmetric learning systems, but also to provide a physically meaningful way of generalising skewed distributions. For rigour, our extension is proved to share important and desirable properties with its symmetric counterpart. We also demonstrate that the proposed vMF distribution is both easy to generate and stable to estimate, both theoretically and through examples.

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“…The quest for more flexible distributions has led to an ever growing development in the literature of parametric distribution. In the past two decades or so, intense interest has been in the area of skew or asymmetric distributions; see, for example, the book edited by Genton (2004), the monograph by Azzalini and Capitanio (2014), and the papers by Azzalini (2005), Arellano-Valle and Azzalini (2006) and Adcock and Azzalini (2020) for recent accounts of the literature on skew distributions. Many of these formulations belong to the class of skew-symmetric distributions, which is a generalization of the classical skew normal (SN) distribution by Azzalini and Dalla Valle (1996).…”

Section: Introductionmentioning

confidence: 99%

On mean and/or variance mixtures of normal distributions

Lee¹,

McLachlan²

2020

Preprint

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Parametric distributions are an important part of statistics. There is now a voluminous literature on different fascinating formulations of flexible distributions. We present a selective and brief overview of a small subset of these distributions, focusing on those that are obtained by scaling the mean and/or covariance matrix of the (multivariate) normal distribution with some scaling variable(s). Namely, we consider the families of mean mixture, variance mixture, and mean-variance mixture of normal distributions. Its basic properties, some notable special/limiting cases, and parameter estimation methods are also described.

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A Selective Overview of Skew-Elliptical and Related Distributions and of Their Applications

Cited by 37 publications

References 210 publications

Cumulants of Multivariate Symmetric and Skew Symmetric Distributions

Cumulants of Multivariate Symmetric and Skew Symmetric Distributions

Von Mises-Fisher Elliptical Distribution

On mean and/or variance mixtures of normal distributions

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