Double Robust Variance Estimation with Parametric Working Models
Abstract
Doubly robust estimators have gained popularity in the field of causal inference due to their ability to provide consistent point estimates when either an outcome or exposure model is correctly specified. However, for nonrandomized exposures the influence function based variance estimator frequently used with doubly robust estimators of the average causal effect is only consistent when both working models (i.e., outcome and exposure models) are correctly specified. Here, the empirical sandwich variance estimator and the nonparametric bootstrap are demonstrated to be doubly robust variance estimators. That is, they are expected to provide valid estimates of the variance leading to nominal confidence interval coverage when only one working model is correctly specified. Simulation studies illustrate the properties of the influence function based, empirical sandwich, and nonparametric bootstrap variance estimators in the setting where parametric working models are assumed. Estimators are applied to data from the Improving Pregnancy Outcomes with Progesterone (IPOP) study to estimate the effect of maternal anemia on birth weight among women with HIV.
Cite
@article{arxiv.2404.16166,
title = {Double Robust Variance Estimation with Parametric Working Models},
author = {Bonnie E. Shook-Sa and Paul N. Zivich and Chanhwa Lee and Keyi Xue and Rachael K. Ross and Jessie K. Edwards and Jeffrey S. A. Stringer and Stephen R. Cole},
journal= {arXiv preprint arXiv:2404.16166},
year = {2024}
}
Comments
32 pages, 14 figures, 13 tables