Litcius/Paper detail

Inference for High-Dimensional Linear Mixed-Effects Models: A Quasi-Likelihood Approach

Sai Li, Tommaso Cai, Hongzhe Li

2021Journal of the American Statistical Association26 citationsDOIOpen Access PDF

Abstract

Linear mixed-effects models are widely used in analyzing clustered or repeated measures data. We propose a quasi-likelihood approach for estimation and inference of the unknown parameters in linear mixed-effects models with high-dimensional fixed effects. The proposed method is applicable to general settings where the dimension of the random effects and the cluster sizes are possibly large. Regarding the fixed effects, we provide rate optimal estimators and valid inference procedures that do not rely on the structural information of the variance components. We also study the estimation of variance components with high-dimensional fixed effects in general settings. The algorithms are easy to implement and computationally fast. The proposed methods are assessed in various simulation settings and are applied to a real study regarding the associations between body mass index and genetic polymorphic markers in a heterogeneous stock mice population.

Topics & Concepts

InferenceGeneralized linear mixed modelRandom effects modelEstimatorMixed modelComputer scienceLinear modelVariance (accounting)PopulationDimension (graph theory)StatisticsMathematicsArtificial intelligencePure mathematicsInternal medicineAccountingBusinessMedicineSociologyMeta-analysisDemographyGenetic Mapping and Diversity in Plants and AnimalsGenetic and phenotypic traits in livestockGene expression and cancer classification