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二元工具变量与删失数据下因果分位数效应的估计

Estimation of Causal Quantile Effects with a Binary Instrumental Variable and Censored Data

Journal of the Royal Statistical Society. Series B: Statistical Methodology · 2021
被引 12
ABS 4

中文导读

针对存在未测量混杂和随机删失结局的情况,提出用依从者分位数因果效应量化处理因果效应,并开发了基于条件得分加权的删失分位数回归估计方法。

Abstract

The causal effect of a treatment is of fundamental interest in the social, biological, and health sciences. Instrumental variable (IV) methods are commonly used to determine causal treatment effects in the presence of unmeasured confounding. In this work, we study a new binary IV framework with randomly censored outcomes where we propose to quantify the causal treatment effect by the concept of complier quantile causal effect (CQCE). The CQCE is identifiable under weaker conditions than the complier average causal effect when outcomes are subject to censoring, and it can provide useful insight into the dynamics of the causal treatment effect. Employing the special characteristic of the binary IV and adapting the principle of conditional score, we uncover a simple weighting scheme that can be incorporated into the standard censored quantile regression procedure to estimate CQCE. We develop robust nonparametric estimation of the derived weights in the first stage, which permits stable implementation of the second stage estimation based on existing software. We establish rigorous asymptotic properties for the proposed estimator, and confirm its validity and satisfactory finite-sample performance via extensive simulations. The proposed method is applied to a bone marrow transplant dataset to evaluate the causal effect of rituximab in diffuse large B-cell lymphoma patients.

计量经济学因果推断工具变量删失数据分位数回归