A formulation for continuous mixtures of multivariate normal distributions

Abstract
Several formulations have long existed in the literature in the form of continuous mixtures of normal variables where a mixing variable operates on the mean or on the variance or on both the mean and the variance of a multivariate normal variable, by changing the nature of these basic constituents from constants to random quantities. More recently, other mixture-type constructions have been introduced, where the core random component, on which the mixing operation operates, is not necessarily normal. The main aim of the present work is to show that many existing constructions can be encompassed by a formulation where normal variables are mixed using two univariate random variables. For this formulation, we derive various general properties, with focus on the multivariate context. Within the proposed framework, it is also simpler to formulate new proposals of parametric families, and we provide a few such instances. As a side product, the exposition provides a concise compendium of the main constructions of continuous normal-mixtures type, although a full overview of this vast theme is not attempted. (C) 2021 Published by Elsevier Inc.
Description
Keywords
Continuous mixtures of normal distributions, Mardia's measures of multivariate skewness and kurtosis, Variance-mean mixtures of distributions, HYPERBOLIC DISTRIBUTION, PORTFOLIO SELECTION, SKEWNESS, KURTOSIS
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