Integral, mean and covariance of the simplex-truncated multivariate normal distribution

Author:

Adams Matthew P.ORCID

Abstract

Compositional data, which is data consisting of fractions or probabilities, is common in many fields including ecology, economics, physical science and political science. If these data would otherwise be normally distributed, their spread can be conveniently represented by a multivariate normal distribution truncated to the non-negative space under a unit simplex. Here this distribution is called the simplex-truncated multivariate normal distribution. For calculations on truncated distributions, it is often useful to obtain rapid estimates of their integral, mean and covariance; these quantities characterising the truncated distribution will generally possess different values to the corresponding non-truncated distribution. In this paper, three different approaches that can estimate the integral, mean and covariance of any simplex-truncated multivariate normal distribution are described and compared. These three approaches are (1) naive rejection sampling, (2) a method described by Gessner et al. that unifies subset simulation and the Holmes-Diaconis-Ross algorithm with an analytical version of elliptical slice sampling, and (3) a semi-analytical method that expresses the integral, mean and covariance in terms of integrals of hyperrectangularly-truncated multivariate normal distributions, the latter of which are readily computed in modern mathematical and statistical packages. Strong agreement is demonstrated between all three approaches, but the most computationally efficient approach depends strongly both on implementation details and the dimension of the simplex-truncated multivariate normal distribution. For computations in low-dimensional distributions, the semi-analytical method is fast and thus should be considered. As the dimension increases, the Gessner et al. method becomes the only practically efficient approach of the methods tested here.

Funder

Australian Research Council

Publisher

Public Library of Science (PLoS)

Subject

Multidisciplinary

Reference28 articles.

1. Moments calculation for truncated multivariate normal in nonlinear generalized mixed models;SC Lee;Commun Stat Appl Meth,2020

2. Simulation of truncated normal variables;CP Robert;Stat Comput,1995

3. Moments of a linearly truncated bivariate normal distribution;GB Nath;Aust J Stat,1972

4. Moments of the censored and truncated bivariate normal distribution;B Muthén;Brit J Math Stat Psy,1990

5. Bayesian inference on the parameters of the truncated normal distribution and application to reverberation chamber measurement data;R Serra;Meas Sci Technol,2020

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