English

Scalable high-dimensional Bayesian varying coefficient models with unknown within-subject covariance

Methodology 2023-09-19 v9

Abstract

Nonparametric varying coefficient (NVC) models are useful for modeling time-varying effects on responses that are measured repeatedly for the same subjects. When the number of covariates is moderate or large, it is desirable to perform variable selection from the varying coefficient functions. However, existing methods for variable selection in NVC models either fail to account for within-subject correlations or require the practitioner to specify a parametric form for the correlation structure. In this paper, we introduce the nonparametric varying coefficient spike-and-slab lasso (NVC-SSL) for Bayesian high-dimensional NVC models. Through the introduction of functional random effects, our method allows for flexible modeling of within-subject correlations without needing to specify a parametric covariance function. We further propose several scalable optimization and Markov chain Monte Carlo (MCMC) algorithms. For variable selection, we propose an Expectation Conditional Maximization (ECM) algorithm to rapidly obtain maximum a posteriori (MAP) estimates. Our ECM algorithm scales linearly in the total number of observations NN and the number of covariates pp. For uncertainty quantification, we introduce an approximate MCMC algorithm that also scales linearly in both NN and pp. We demonstrate the scalability, variable selection performance, and inferential capabilities of our method through simulations and a real data application. These algorithms are implemented in the publicly available R package NVCSSL on the Comprehensive R Archive Network.

Keywords

Cite

@article{arxiv.1907.06477,
  title  = {Scalable high-dimensional Bayesian varying coefficient models with unknown within-subject covariance},
  author = {Ray Bai and Mary R. Boland and Yong Chen},
  journal= {arXiv preprint arXiv:1907.06477},
  year   = {2023}
}

Comments

44 pages, 7 tables, 8 figures. This new version focuses on methodology and computation and includes new MCMC algorithms for uncertainty quantification

R2 v1 2026-06-23T10:21:08.740Z