Litcius/Paper detail

Causal inference with invalid instruments: post-selection problems and a solution using searching and sampling

Zijian Guo

2023Journal of the Royal Statistical Society Series B (Statistical Methodology)10 citationsDOIOpen Access PDF

Abstract

Abstract Instrumental variable methods are among the most commonly used causal inference approaches to deal with unmeasured confounders in observational studies. The presence of invalid instruments is the primary concern for practical applications, and a fast-growing area of research is inference for the causal effect with possibly invalid instruments. This paper illustrates that the existing confidence intervals may undercover when the valid and invalid instruments are hard to separate in a data-dependent way. To address this, we construct uniformly valid confidence intervals that are robust to the mistakes in separating valid and invalid instruments. We propose to search for a range of treatment effect values that lead to sufficiently many valid instruments. We further devise a novel sampling method, which, together with searching, leads to a more precise confidence interval. Our proposed searching and sampling confidence intervals are uniformly valid and achieve the parametric length under the finite-sample majority and plurality rules. We apply our proposal to examine the effect of education on earnings. The proposed method is implemented in the R package RobustIV available from CRAN.

Topics & Concepts

Causal inferenceComputer scienceInferenceSampling (signal processing)Confidence intervalParametric statisticsRange (aeronautics)Construct (python library)Instrumental variableSelection (genetic algorithm)Sample (material)Sample size determinationObservational studyEconometricsData miningStatisticsMachine learningMathematicsArtificial intelligenceFilter (signal processing)EngineeringComputer visionAerospace engineeringChemistryProgramming languageChromatographyAdvanced Causal Inference TechniquesStatistical Methods and InferenceStatistical Methods and Bayesian Inference