Multivariate inhomogeneous diffusion models with covariates and mixed effects
Abstract
Modeling of longitudinal data often requires diffusion models that incorporate overall time-dependent, nonlinear dynamics of multiple components and provide sufficient flexibility for subject-specific modeling. This complexity challenges parameter inference and approximations are inevitable. We propose a method for approximate maximum-likelihood parameter estimation in multivariate time-inhomogeneous diffusions, where subject-specific flexibility is accounted for by incorporation of multidimensional mixed effects and covariates. We consider multidimensional independent diffusions , with common overall model structure and unknown fixed-effects parameter . Their dynamics differ by the subject-specific random effect in the drift and possibly by (known) covariate information, different initial conditions and observation times and duration. The distribution of is parametrized by an unknown and is the target of statistical inference. Its maximum likelihood estimator is derived from the continuous-time likelihood. We prove consistency and asymptotic normality of when the number of subjects goes to infinity using standard techniques and consider the more general concept of local asymptotic normality for less regular models. The bias induced by time-discretization of sufficient statistics is investigated. We discuss verification of conditions and investigate parameter estimation and hypothesis testing in simulations.
Cite
@article{arxiv.1701.08284,
title = {Multivariate inhomogeneous diffusion models with covariates and mixed effects},
author = {Mareile Große Ruse and Adeline Samson and Susanne Ditlevsen},
journal= {arXiv preprint arXiv:1701.08284},
year = {2017}
}