Abstract:

This study proposes novel estimation and inference approaches for heterogeneous local treatment effects using high-dimensional covariates and observational data without a strong ignorability assumption. To achieve this, with a binary instrumental variable, the parameters of interest are identified on an unobservable subgroup of the population (compliers). Lasso estimation under a non-convex objective function is developed for a two-stage generalized linear model, and a debiased estimator is proposed to construct confidence intervals for treatment effects conditioned on covariates. Notably, this approach simultaneously corrects the biases due to high-dimensional estimation at both stages. The finite sample performance is evaluated via simulation studies, and real data analysis is performed on the Oregon Health Insurance Experiment to illustrate the feasibility of the proposed procedure.

(Link: https://rss.onlinelibrary.wiley.com/doi/10.1111/rssb.12469)

Papers Published in 2021:
[1] Deng YH, Chen FY, Li Y, Qian KH, Wang R, Zhou XH. A powerful test for the maximum treatment effect in through QT/QTc studies. Statistics in Medicine. 2021;40:1947‒1959.
[2] Liu YL, Ying GS, Quinn GE, Zhou XH, Chen Y. Extending Hui-Walter framework to correlated outcomes with application to diagnosis tests of an eye disease among premature infants. Statistics in Medicine 2021, 2-15. DOI: 10.1002/sim.0000
[3] Qiu, Y; Tao, J; Xiao-Hua Zhou*. Inference for Heterogeneous Treatment Effects for Observational Data with High-Dimensional Covariates.Journal of the Royal Statistical Society 2021,9. DOI: 10.1111/rssb.12469

      Prof. Zhou Xiaohua