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Scale mixture of skew‐normal linear mixed models with within‐subject serial dependence

Fernanda L. Schumacher, Victor H. Lachos, Larissa A. Matos

2021Statistics in Medicine21 citationsDOIOpen Access PDF

Abstract

In longitudinal studies, repeated measures are collected over time and hence they tend to be serially correlated. These studies are commonly analyzed using linear mixed models (LMMs), and in this article we consider an extension of the skew-normal/independent LMM, where the error term has a dependence structure, such as damped exponential correlation or autoregressive correlation of order p. The proposed model provides flexibility in capturing the effects of skewness and heavy tails simultaneously when continuous repeated measures are serially correlated. For this robust model, we present an efficient EM-type algorithm for parameters estimation via maximum likelihood and the observed information matrix is derived analytically to account for standard errors. The methodology is illustrated through an application to schizophrenia data and some simulation studies. The proposed algorithm and methods are implemented in the new R package skewlmm.

Topics & Concepts

Mixed modelAutoregressive modelSkewnessGeneralized linear mixed modelAutocorrelationMathematicsApplied mathematicsFlexibility (engineering)Exponential functionAlgorithmComputer scienceInformation CriteriaLinear modelScale (ratio)Term (time)Matrix (chemical analysis)StatisticsExpectation–maximization algorithmMaximum likelihoodMixture modelExtension (predicate logic)Fisher informationKurtosisLinear scaleEstimation theoryCorrelationObservational errorMeasure (data warehouse)Mathematical optimizationRestricted maximum likelihoodStatistical modelLongitudinal dataStatistical Methods and Bayesian InferenceBayesian Methods and Mixture ModelsStatistical Methods and Inference
Scale mixture of skew‐normal linear mixed models with within‐subject serial dependence | Litcius