Abstract
Observational data are increasingly used with the aim of estimating causal effects of treatments, through careful control for confounding. Marginal structural models estimated using inverse probability weighting (MSMs-IPW), like other methods to control for confounding, assume that confounding variables are measured without error. The average treatment effect in an MSM-IPW may however be biased when a confounding variable is error prone. Using the potential outcome framework, we derive expressions for the bias due to confounder misclassification in analyses that aim to estimate the average treatment effect using an marginal structural model estimated using inverse probability weighting (MSM-IPW). We compare this bias with the bias due to confounder misclassification in analyses based on a conditional regression model. Focus is on a point-treatment study with a continuous outcome. Compared with bias in the average treatment effect in a conditional model, the bias in an MSM-IPW can be different in magnitude but is equal in sign. Also, we use a simulation study to investigate the finite sample performance of MSM-IPW and conditional models when a confounding variable is misclassified. Simulation results indicate that confidence intervals of the treatment effect obtained from MSM-IPW are generally wider, and coverage of the true treatment effect is higher compared with a conditional model, ranging from overcoverage if there is no confounder misclassification to undercoverage when there is confounder misclassification. Further, we illustrate in a study of blood pressure-lowering therapy, how the bias expressions can be used to inform a quantitative bias analysis to study the impact of confounder misclassification, supported by an online tool.
Highlights
The intercept, the coefficient for A and the coefficient for L∗ of the conditional regression model for Y given A and L∗ which includes only main effects of A and L∗ are, respectively:
Under the assumptions and notation described in section of the main article and by the law of total expectation, the expected value of the outcome Y given the covariates A and L∗
Only main effects of A and L∗ are included in a regression model of Y conditional on A and L∗: EAL∗|A,L∗{E[Y |A, L∗]} = {α + γφ00} + {β + γ(φ10 − φ00)}A + {γ(φ01 − φ00)}L∗ + γ(φ11 − φ10 − φ01 + φ00) E[AL∗|A, L]
Summary
The intercept, the coefficient for A and the coefficient for L∗ of the conditional regression model for Y given A and L∗ which includes only main effects of A and L∗ are, respectively:. Only main effects of A and L∗ are included in a regression model of Y conditional on A and L∗: EAL∗|A,L∗{E[Y |A, L∗]} = {α + γφ00} + {β + γ(φ10 − φ00)}A + {γ(φ01 − φ00)}L∗ + γ(φ11 − φ10 − φ01 + φ00) E[AL∗|A, L]
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