Add to ORKGAbstract Constructing skew and heavy-tailed distributions by transform-ing a standard normal variable goes back to Tukey (1977) and was extended and formalized by Hoaglin (1983) and Martinez & Iglewicz (1984). Applica-tions of Tukey’s GH distribution family – which are composed by a skew-ness transformation G and a kurtosis transformation H – can be found, for instance, in financial, environmental or medical statistics. Recently, alter-native transformations emerged in the literature. Rayner & MacGillivray (2002b) discuss the GK distributions, where Tukey’s H-transformation is replaced by another kurtosis transformation K. Similarly, Fischer & Klein (2004) advocate the J-transformation which also produces heavy tails but – in co...
The family of g-and-h transformations are popular algorithms used for simulating non-normal distribu...
The family of g-and-h transformations are popular algorithms used for simulating non-normal distribu...
Since financial series are usually heavy-tailed and skewed, research has formerly considered well-kn...
We introduce a new family of multivariate distributions by taking the component-wise Tukey-h transfo...
A new class of distribution function based on the symmetric densities is introduced, these transform...
This paper develops a skewed extension of the generalized t (GT) distribution, introduced by McDonal...
Abstract The family of g-and-h transformations are popular algorithms used for simulating non-normal...
We define a new boxplot that can deal with skewed and/or heavy-tailed distributions and possible out...
Skewness and elongation are two factors that directly determine the shape of a probability distribut...
The Generalized Lambda Distribution (GλD) is a four-parameter generalization of Tukey’s Lambda famil...
Motivated by the need for parametric families of rich and yet tractable distributions in financial m...
I present a parametric, bijective transformation to generate heavy tail versions of arbitrary random...
In this paper we study an extension of the Gram–Charlier (GC) density in Jondeau and Rockinger (2001...
Abstract: Leptokurtic or platykurtic distributions can, for example, be gen-erated by applying certa...
Abstract: Leptokurtic or platykurtic distributions can, for example, be gen-erated by applying certa...
The family of g-and-h transformations are popular algorithms used for simulating non-normal distribu...
The family of g-and-h transformations are popular algorithms used for simulating non-normal distribu...
Since financial series are usually heavy-tailed and skewed, research has formerly considered well-kn...
We introduce a new family of multivariate distributions by taking the component-wise Tukey-h transfo...
A new class of distribution function based on the symmetric densities is introduced, these transform...
This paper develops a skewed extension of the generalized t (GT) distribution, introduced by McDonal...
Abstract The family of g-and-h transformations are popular algorithms used for simulating non-normal...
We define a new boxplot that can deal with skewed and/or heavy-tailed distributions and possible out...
Skewness and elongation are two factors that directly determine the shape of a probability distribut...
The Generalized Lambda Distribution (GλD) is a four-parameter generalization of Tukey’s Lambda famil...
Motivated by the need for parametric families of rich and yet tractable distributions in financial m...
I present a parametric, bijective transformation to generate heavy tail versions of arbitrary random...
In this paper we study an extension of the Gram–Charlier (GC) density in Jondeau and Rockinger (2001...
Abstract: Leptokurtic or platykurtic distributions can, for example, be gen-erated by applying certa...
Abstract: Leptokurtic or platykurtic distributions can, for example, be gen-erated by applying certa...
The family of g-and-h transformations are popular algorithms used for simulating non-normal distribu...
The family of g-and-h transformations are popular algorithms used for simulating non-normal distribu...
Since financial series are usually heavy-tailed and skewed, research has formerly considered well-kn...