Bounding Causal Effects with Leaky Instruments
Abstract
Instrumental variables (IVs) are a popular and powerful tool for estimating causal effects in the presence of unobserved confounding. However, classical approaches rely on strong assumptions such as the , which states that instrumental effects must be entirely mediated by treatments. This assumption often fails in practice. When IV methods are improperly applied to data that do not meet the exclusion criterion, estimated causal effects may be badly biased. In this work, we propose a novel solution that provides identification in linear systems given a set of , which are allowed to violate the exclusion criterion to some limited degree. We derive a convex optimization objective that provides provably sharp bounds on the average treatment effect under some common forms of information leakage, and implement inference procedures to quantify the uncertainty of resulting estimates. We demonstrate our method in a set of experiments with simulated data, where it performs favorably against the state of the art. An accompanying package, , is available from .
Cite
@article{arxiv.2404.04446,
title = {Bounding Causal Effects with Leaky Instruments},
author = {David S. Watson and Jordan Penn and Lee M. Gunderson and Gecia Bravo-Hermsdorff and Afsaneh Mastouri and Ricardo Silva},
journal= {arXiv preprint arXiv:2404.04446},
year = {2024}
}
Comments
Camera ready version (UAI 2024)