IPW估计的自适应归一化

IF 1.7 4区 医学 Q2 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS
Samir Khan, J. Ugander
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引用次数: 12

摘要

逆概率加权(IPW)是一种用于调查抽样和因果推理的通用工具,用于通过样本量进行归一化的Horvitz-Thompson估计量和通过逆概率权和进行归一化的Hájek/自归一化估计量。在这项工作中,我们研究了一类IPW估计量,它们首先由Trotter和Tukey在蒙特卡罗问题的背景下提出,通过样本大小和逆权和的仿射组合进行归一化。我们展示了如何以数据相关的方式从这个族中选择一个估计量来最小化渐近方差,从而导致一个迭代过程收敛到一个与回归控制方法有联系的估计量。我们把这样的估计量称为自适应归一化估计量。对于调查抽样的均值估计,自适应归一化估计量的渐近方差不会比Horvitz-Thompson和Hájek估计量差。进一步,我们表明自适应归一化可以用来提出增强IPW (AIPW)估计器、平均处理效果(ATE)估计器和策略学习目标的改进。值得注意的是,这些建议既保留了AIPW的渐近效率,又保留了具有IPW目标的策略学习的遗憾界限,并在模拟中为所有三种方法(均值估计、ATE估计和策略学习)提供了一致的有限样本改进。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Adaptive normalization for IPW estimation
Abstract Inverse probability weighting (IPW) is a general tool in survey sampling and causal inference, used in both Horvitz–Thompson estimators, which normalize by the sample size, and Hájek/self-normalized estimators, which normalize by the sum of the inverse probability weights. In this work, we study a family of IPW estimators, first proposed by Trotter and Tukey in the context of Monte Carlo problems, that are normalized by an affine combination of the sample size and a sum of inverse weights. We show how selecting an estimator from this family in a data-dependent way to minimize asymptotic variance leads to an iterative procedure that converges to an estimator with connections to regression control methods. We refer to such estimators as adaptively normalized estimators. For mean estimation in survey sampling, the adaptively normalized estimator has asymptotic variance that is never worse than the Horvitz–Thompson and Hájek estimators. Going further, we show that adaptive normalization can be used to propose improvements of the augmented IPW (AIPW) estimator, average treatment effect (ATE) estimators, and policy learning objectives. Appealingly, these proposals preserve both the asymptotic efficiency of AIPW and the regret bounds for policy learning with IPW objectives, and deliver consistent finite sample improvements in simulations for all three of mean estimation, ATE estimation, and policy learning.
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来源期刊
Journal of Causal Inference
Journal of Causal Inference Decision Sciences-Statistics, Probability and Uncertainty
CiteScore
1.90
自引率
14.30%
发文量
15
审稿时长
86 weeks
期刊介绍: Journal of Causal Inference (JCI) publishes papers on theoretical and applied causal research across the range of academic disciplines that use quantitative tools to study causality.
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