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Interpoint Distance Test of Homogeneity for Multivariate Mixture Models
Author(s) -
Song Yu,
Modarres Reza
Publication year - 2019
Publication title -
international statistical review
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 1.051
H-Index - 54
eISSN - 1751-5823
pISSN - 0306-7734
DOI - 10.1111/insr.12332
Subject(s) - wishart distribution , homogeneity (statistics) , mathematics , multivariate statistics , matrix t distribution , statistics , inverse wishart distribution , normal wishart distribution , multivariate stable distribution , test statistic , multivariate normal distribution , multivariate t distribution , likelihood ratio test , expectation–maximization algorithm , statistical hypothesis testing , maximum likelihood
Summary Finite mixtures offer a rich class of distributions for modelling of a variety of random phenomena in numerous fields of study. Using the sample interpoint distances (IPDs), we propose the IPD‐test statistic for testing the hypothesis of homogeneity of mixture of multivariate power series distribution or multivariate normal distribution. We derive the distribution of the IPDs that are drawn from a finite mixture of the multivariate power series distribution and multivariate normal distribution. Based on the empirical distribution of the IPDs, we construct a bootstrap test of homogeneity for other multivariate finite mixture models. The IPD test is applied to mixture models for matrix‐valued distributions and a test of homogeneity for Wishart mixture is presented. Numerical comparisons show that IPD test has accurate type I errors and is more powerful in most multivariate cases than the expectation–maximization (EM) test and modified likelihood ratio test.