矩阵变量广义非对称拉普拉斯分布

IF 0.4 Q4 STATISTICS & PROBABILITY Theory of Probability and Mathematical Statistics Pub Date : 2023-10-03 DOI:10.1090/tpms/1197
Tomasz Kozubowski, Stepan Mazur, Krzysztof Podgórski
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引用次数: 0

摘要

广义非对称拉普拉斯(GAL)分布,也称为方差/均值-伽马模型,构成了一类流行的灵活分布,可以解释峰态、偏态和比正态更重的尾部,通常在金融或其他经验数据中观察到。我们考虑将GAL分布扩展到矩阵变量情况,即矩阵变量正态分布的协方差混合。考虑了与随机标度矩阵的性质有关的两种不同的混合机制,导致我们称之为I型和II型矩阵变量GAL分布。虽然以前已经研究过I型矩阵变量GAL分布,但除了将II型作为矩阵变量广义双曲分布的特殊情况进行了相当简短的处理外,文献中没有对II型进行全面的描述。通过这项工作,我们填补了这一空白,并提出了II型矩阵变量GAL分布的基本分布性质的解释。特别是,我们推导了它们的概率密度函数和特征函数,并提供了与矩阵变量伽马分布相关的随机表示。我们还证明了该分布在线性变换下是封闭的,并研究了相关的边际分布。此外,我们还简要说明了I型,并讨论了与II型的有趣联系。我们希望这项工作将在矩阵变量分布为三方或更普遍的面板数据集提供适当概率工具的领域有用,这些数据集可能出现在不同的应用中。
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Matrix variate generalized asymmetric Laplace distributions
The generalized asymmetric Laplace (GAL) distributions, also known as the variance/mean-gamma models, constitute a popular flexible class of distributions that can account for peakedness, skewness, and heavier-than-normal tails, often observed in financial or other empirical data. We consider extensions of the GAL distribution to the matrix variate case, which arise as covariance mixtures of matrix variate normal distributions. Two different mixing mechanisms connected with the nature of the random scaling matrix are considered, leading to what we term matrix variate GAL distributions of Type I and II. While Type I matrix variate GAL distribution has been studied before, there is no comprehensive account of Type II in the literature, except for their rather brief treatment as a special case of matrix variate generalized hyperbolic distributions. With this work we fill this gap, and present an account for basic distributional properties of Type II matrix variate GAL distributions. In particular, we derive their probability density function and the characteristic function, as well as provide stochastic representations related to matrix variate gamma distribution. We also show that this distribution is closed under linear transformations, and study the relevant marginal distributions. In addition, we also briefly account for Type I and discuss the intriguing connections with Type II. We hope that this work will be useful in the areas where matrix variate distributions provide an appropriate probabilistic tool for three-way or, more generally, panel data sets, which can arise across different applications.
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来源期刊
CiteScore
1.30
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0.00%
发文量
22
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