Inverse probability of treatment weighting with generalized linear outcome models for doubly robust estimation

Research output: Contribution to journalJournal articleResearchpeer-review

Standard

Inverse probability of treatment weighting with generalized linear outcome models for doubly robust estimation. / Gabriel, Erin E.; Sachs, Michael C.; Martinussen, Torben; Waernbaum, Ingeborg; Goetghebeur, Els; Vansteelandt, Stijn; Sjölander, Arvid.

In: Statistics in Medicine, Vol. 43, No. 3, 2023.

Research output: Contribution to journalJournal articleResearchpeer-review

Harvard

Gabriel, EE, Sachs, MC, Martinussen, T, Waernbaum, I, Goetghebeur, E, Vansteelandt, S & Sjölander, A 2023, 'Inverse probability of treatment weighting with generalized linear outcome models for doubly robust estimation', Statistics in Medicine, vol. 43, no. 3. https://doi.org/10.1002/sim.9969

APA

Gabriel, E. E., Sachs, M. C., Martinussen, T., Waernbaum, I., Goetghebeur, E., Vansteelandt, S., & Sjölander, A. (2023). Inverse probability of treatment weighting with generalized linear outcome models for doubly robust estimation. Statistics in Medicine, 43(3). https://doi.org/10.1002/sim.9969

Vancouver

Gabriel EE, Sachs MC, Martinussen T, Waernbaum I, Goetghebeur E, Vansteelandt S et al. Inverse probability of treatment weighting with generalized linear outcome models for doubly robust estimation. Statistics in Medicine. 2023;43(3). https://doi.org/10.1002/sim.9969

Author

Gabriel, Erin E. ; Sachs, Michael C. ; Martinussen, Torben ; Waernbaum, Ingeborg ; Goetghebeur, Els ; Vansteelandt, Stijn ; Sjölander, Arvid. / Inverse probability of treatment weighting with generalized linear outcome models for doubly robust estimation. In: Statistics in Medicine. 2023 ; Vol. 43, No. 3.

Bibtex

@article{ff7fce3d56744058b1be6dd13a64bd85,
title = "Inverse probability of treatment weighting with generalized linear outcome models for doubly robust estimation",
abstract = "There are now many options for doubly robust estimation; however, there is a concerning trend in the applied literature to believe that the combination of a propensity score and an adjusted outcome model automatically results in a doubly robust estimator and/or to misuse more complex established doubly robust estimators. A simple alternative, canonical link generalized linear models (GLM) fit via inverse probability of treatment (propensity score) weighted maximum likelihood estimation followed by standardization (the (Formula presented.) -formula) for the average causal effect, is a doubly robust estimation method. Our aim is for the reader not just to be able to use this method, which we refer to as IPTW GLM, for doubly robust estimation, but to fully understand why it has the doubly robust property. For this reason, we define clearly, and in multiple ways, all concepts needed to understand the method and why it is doubly robust. In addition, we want to make very clear that the mere combination of propensity score weighting and an adjusted outcome model does not generally result in a doubly robust estimator. Finally, we hope to dispel the misconception that one can adjust for residual confounding remaining after propensity score weighting by adjusting in the outcome model for what remains {\textquoteleft}unbalanced{\textquoteright} even when using doubly robust estimators. We provide R code for our simulations and real open-source data examples that can be followed step-by-step to use and hopefully understand the IPTW GLM method. We also compare to a much better-known but still simple doubly robust estimator.",
keywords = "causal inference, doubly robust, generalized linear models",
author = "Gabriel, {Erin E.} and Sachs, {Michael C.} and Torben Martinussen and Ingeborg Waernbaum and Els Goetghebeur and Stijn Vansteelandt and Arvid Sj{\"o}lander",
note = "Publisher Copyright: {\textcopyright} 2023 The Authors. Statistics in Medicine published by John Wiley & Sons Ltd.",
year = "2023",
doi = "10.1002/sim.9969",
language = "English",
volume = "43",
journal = "Statistics in Medicine",
issn = "0277-6715",
publisher = "JohnWiley & Sons Ltd",
number = "3",

}

RIS

TY - JOUR

T1 - Inverse probability of treatment weighting with generalized linear outcome models for doubly robust estimation

AU - Gabriel, Erin E.

AU - Sachs, Michael C.

AU - Martinussen, Torben

AU - Waernbaum, Ingeborg

AU - Goetghebeur, Els

AU - Vansteelandt, Stijn

AU - Sjölander, Arvid

N1 - Publisher Copyright: © 2023 The Authors. Statistics in Medicine published by John Wiley & Sons Ltd.

PY - 2023

Y1 - 2023

N2 - There are now many options for doubly robust estimation; however, there is a concerning trend in the applied literature to believe that the combination of a propensity score and an adjusted outcome model automatically results in a doubly robust estimator and/or to misuse more complex established doubly robust estimators. A simple alternative, canonical link generalized linear models (GLM) fit via inverse probability of treatment (propensity score) weighted maximum likelihood estimation followed by standardization (the (Formula presented.) -formula) for the average causal effect, is a doubly robust estimation method. Our aim is for the reader not just to be able to use this method, which we refer to as IPTW GLM, for doubly robust estimation, but to fully understand why it has the doubly robust property. For this reason, we define clearly, and in multiple ways, all concepts needed to understand the method and why it is doubly robust. In addition, we want to make very clear that the mere combination of propensity score weighting and an adjusted outcome model does not generally result in a doubly robust estimator. Finally, we hope to dispel the misconception that one can adjust for residual confounding remaining after propensity score weighting by adjusting in the outcome model for what remains ‘unbalanced’ even when using doubly robust estimators. We provide R code for our simulations and real open-source data examples that can be followed step-by-step to use and hopefully understand the IPTW GLM method. We also compare to a much better-known but still simple doubly robust estimator.

AB - There are now many options for doubly robust estimation; however, there is a concerning trend in the applied literature to believe that the combination of a propensity score and an adjusted outcome model automatically results in a doubly robust estimator and/or to misuse more complex established doubly robust estimators. A simple alternative, canonical link generalized linear models (GLM) fit via inverse probability of treatment (propensity score) weighted maximum likelihood estimation followed by standardization (the (Formula presented.) -formula) for the average causal effect, is a doubly robust estimation method. Our aim is for the reader not just to be able to use this method, which we refer to as IPTW GLM, for doubly robust estimation, but to fully understand why it has the doubly robust property. For this reason, we define clearly, and in multiple ways, all concepts needed to understand the method and why it is doubly robust. In addition, we want to make very clear that the mere combination of propensity score weighting and an adjusted outcome model does not generally result in a doubly robust estimator. Finally, we hope to dispel the misconception that one can adjust for residual confounding remaining after propensity score weighting by adjusting in the outcome model for what remains ‘unbalanced’ even when using doubly robust estimators. We provide R code for our simulations and real open-source data examples that can be followed step-by-step to use and hopefully understand the IPTW GLM method. We also compare to a much better-known but still simple doubly robust estimator.

KW - causal inference

KW - doubly robust

KW - generalized linear models

U2 - 10.1002/sim.9969

DO - 10.1002/sim.9969

M3 - Journal article

C2 - 38096856

AN - SCOPUS:85179690374

VL - 43

JO - Statistics in Medicine

JF - Statistics in Medicine

SN - 0277-6715

IS - 3

ER -

ID: 377783421