RSS Discussion Meeting, Linear mixed effects models for non-Gaussian continuous repeated measurement data

We present our paper (with dicussion) for the Royal statistical society
Presenter

Jonas Wallin

Özgür Asar

David Bolin

Peter J Diggle

Published

June 22, 2020

Publication

RSS Dicussion Meeting, Online

Links

Abstract
We consider the analysis of continuous repeated measurement outcomes that are collected longitudinally. A standard framework for analysing data of this kind is a linear Gaussian mixed effects model within which the outcome variable can be decomposed into fixed effects, time invariant and time-varying random effects, and measurement noise. We develop methodology that, for the first time, allows any combination of these stochastic components to be non-Gaussian, using multivariate normal variance–mean mixtures. To meet the computational challenges that are presented by large data sets, i.e. in the current context, data sets with many subjects and/or many repeated measurements per subject, we propose a novel implementation of maximum likelihood estimation using a computationally efficient subsampling-based stochastic gradient algorithm. We obtain standard error estimates by inverting the observed Fisher information matrix and obtain the predictive distributions for the random effects in both filtering (conditioning on past and current data) and smoothing (conditioning on all data) contexts. To implement these procedures, we introduce an R package ngme. We reanalyse two data sets, from cystic fibrosis and nephrology research, that were previously analysed by using Gaussian linear mixed effects models.

 

Citation

BibTeX citation:
@unpublished{wallin2020,
  author = {Wallin, Jonas and Asar, Özgür and Bolin, David and J Diggle,
    Peter},
  title = {RSS {Discussion} {Meeting,} {Linear} Mixed Effects Models for
    {non-Gaussian} Continuous Repeated Measurement Data},
  date = {2020-06-22},
  url = {https://www.youtube.com/embed/olSFzM-JUtU},
  langid = {en},
  abstract = {We consider the analysis of continuous repeated
    measurement outcomes that are collected longitudinally. A standard
    framework for analysing data of this kind is a linear Gaussian mixed
    effects model within which the outcome variable can be decomposed
    into fixed effects, time invariant and time-varying random effects,
    and measurement noise. We develop methodology that, for the first
    time, allows any combination of these stochastic components to be
    non-Gaussian, using multivariate normal variance–mean mixtures. To
    meet the computational challenges that are presented by large data
    sets, i.e. in the current context, data sets with many subjects
    and/or many repeated measurements per subject, we propose a novel
    implementation of maximum likelihood estimation using a
    computationally efficient subsampling-based stochastic gradient
    algorithm. We obtain standard error estimates by inverting the
    observed Fisher information matrix and obtain the predictive
    distributions for the random effects in both filtering (conditioning
    on past and current data) and smoothing (conditioning on all data)
    contexts. To implement these procedures, we introduce an R package
    ngme. We reanalyse two data sets, from cystic fibrosis and
    nephrology research, that were previously analysed by using Gaussian
    linear mixed effects models.}
}
For attribution, please cite this work as:
Wallin, Jonas, Özgür Asar, David Bolin, and Peter J Diggle. 2020. “RSS Discussion Meeting, Linear Mixed Effects Models for Non-Gaussian Continuous Repeated Measurement Data.” Online, Online, June 22. https://www.youtube.com/embed/olSFzM-JUtU.