因果关系
工具变量
Lasso(编程语言)
混淆
观察研究
结果(博弈论)
对比度(视觉)
计算机科学
因果结构
计量经济学
因果模型
稀疏逼近
因果推理
算法
数学
机器学习
统计
人工智能
法学
数理经济学
政治学
物理
万维网
量子力学
作者
Dingke Tang,Dehan Kong,Linbo Wang
出处
期刊:Cornell University - arXiv
日期:2023-04-03
被引量:1
标识
DOI:10.48550/arxiv.2304.01098
摘要
In many observational studies, researchers are often interested in studying the effects of multiple exposures on a single outcome. Standard approaches for high-dimensional data such as the lasso assume the associations between the exposures and the outcome are sparse. These methods, however, do not estimate the causal effects in the presence of unmeasured confounding. In this paper, we consider an alternative approach that assumes the causal effects in view are sparse. We show that with sparse causation, the causal effects are identifiable even with unmeasured confounding. At the core of our proposal is a novel device, called the synthetic instrument, that in contrast to standard instrumental variables, can be constructed using the observed exposures directly. We show that under linear structural equation models, the problem of causal effect estimation can be formulated as an $\ell_0$-penalization problem, and hence can be solved efficiently using off-the-shelf software. Simulations show that our approach outperforms state-of-art methods in both low-dimensional and high-dimensional settings. We further illustrate our method using a mouse obesity dataset.
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