| Popis: |
Mendelian randomization (MR) is a widely used tool for causal inference in the presence of unobserved confounders, which uses single nucleotide polymorphisms (SNPs) as instrumental variables (IVs) to estimate causal effects. However, SNPs often have weak effects on complex traits, leading to bias and low statistical efficiency in existing MR analysis due to weak instruments that are often used. The linkage disequilibrium (LD) among SNPs poses additional statistical hurdles. Specifically, existing MR methods often restrict analysis to independent SNPs via LD clumping and result in efficiency loss in estimating the causal effect. To address these issues, we propose the Debiased Estimating Equation Method (DEEM), a summary statistics-based MR approach that incorporates a large number of correlated weak-effect and invalid SNPs. DEEM not only effectively eliminates the weak IV bias but also improves the statistical efficiency of the causal effect estimation by leveraging information from many correlated SNPs. DEEM is a versatile method that allows for pleiotropic effects, adjusts for Winner's curse, and is applicable to both two-sample and one-sample MR analyses. Asymptotic analyses of the DEEM estimator demonstrate its attractive theoretical properties. Through extensive simulations and two real data examples, we demonstrate that DEEM improves the efficiency and robustness of MR analysis compared with existing methods. |
