Joint modeling of multiple repeated measures and survival data using multidimensional latent trait linear mixed model

Stat Methods Med Res. 2019 Oct-Nov;28(10-11):3392-3403. doi: 10.1177/0962280218802300. Epub 2018 Oct 11.

Abstract

Impairment caused by Amyotrophic lateral sclerosis (ALS) is multidimensional (e.g. bulbar, fine motor, gross motor) and progressive. Its multidimensional nature precludes a single outcome to measure disease progression. Clinical trials of ALS use multiple longitudinal outcomes to assess the treatment effects on overall improvement. A terminal event such as death or dropout can stop the follow-up process. Moreover, the time to the terminal event may be dependent on the multivariate longitudinal measurements. In this article, we develop a joint model consisting of a multidimensional latent trait linear mixed model (MLTLMM) for the multiple longitudinal outcomes, and a proportional hazards model with piecewise constant baseline hazard for the event time data. Shared random effects are used to link together two models. The model inference is conducted using a Bayesian framework via Markov chain Monte Carlo simulation implemented in Stan language. Our proposed model is evaluated by simulation studies and is applied to the Ceftriaxone study, a motivating clinical trial assessing the effect of ceftriaxone on ALS patients.

Keywords: Amyotrophic lateral sclerosis; Markov chain Monte Carlo; informative dropout; longitudinal data; mixed model.

Publication types

  • Research Support, N.I.H., Extramural

MeSH terms

  • Amyotrophic Lateral Sclerosis / drug therapy*
  • Amyotrophic Lateral Sclerosis / mortality*
  • Bayes Theorem
  • Ceftriaxone / therapeutic use*
  • Disease Progression
  • Humans
  • Linear Models*
  • Markov Chains
  • Monte Carlo Method
  • Proportional Hazards Models
  • Survival Analysis*

Substances

  • Ceftriaxone