 On Parametrization of Multivariate Skew-Normal DistributionMeelis Käärik, Anne Selart and Ene Käärik Communications in Statistics - Theory and Methods, 2015, vol. 44, issue 9, 1869-1885 Abstract: Skew-normal distribution is an extension of the normal distribution where the symmetry of the normal distribution is distorted with an extra parameter called the shape parameter. The scalar version of the skew-normal distribution was introduced already in works by Azzalini (1985) and by Henze (1986). The multivariate skew-normal distribution has received considerable attention over the last years, but unfortunately there is no unique straightforward generalization from the scalar case. Therefore, various families of skew-symmetric distributions with different properties have been proposed and studied. In our work we refer to the “classical” multivariate skew-normal distribution introduced by Azzalini and Dalla Valle (1996). It must be noted that even the Azzalini’s skew-normal distribution can be parametrized in many different ways starting from the initial {Ψ,λ}$\lbrace {\bm\Psi},{\bm\lambda}\rbrace$-parametrization to the currently prevalent {Ω,α}$\lbrace {\bm\Omega},{\bm\alpha}\rbrace$-parametrization. This motivated us to search for viable alternatives and compare the overall behavior of different parametrizations, the key problems addressed in our article. Date: 2015 Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:taf:lstaxx:v:44:y:2015:i:9:p:1869-1885 Ordering information: This journal article can be ordered from DOI: 10.1080/03610926.2012.760277 Access Statistics for this article Communications in Statistics - Theory and Methods is currently edited by Debbie Iscoe More articles in Communications in Statistics - Theory and Methods from Taylor & Francis Journals |
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