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Regularised orthogonal machine learning for nonlinear semiparametric models
[Efficient estimation of models with conditional moment restrictions containing unknown functions]

Author

Listed:
  • Denis Nekipelov
  • Vira Semenova
  • Vasilis Syrgkanis

Abstract

SummaryThis paper proposes a Lasso-type estimator for a high-dimensional sparse parameter identified by a single index conditional moment restriction (CMR). In addition to this parameter, the moment function can also depend on a nuisance function, such as the propensity score or the conditional choice probability, which we estimate by modern machine learning tools. We first adjust the moment function so that the gradient of the future loss function is insensitive (formally, Neyman orthogonal) with respect to the first-stage regularisation bias, preserving the single index property. We then take the loss function to be an indefinite integral of the adjusted moment function with respect to the single index. The proposed Lasso estimator converges at the oracle rate, where the oracle knows the nuisance function and solves only the parametric problem. We demonstrate our method by estimating the short-term heterogeneous impact of Connecticut’s Jobs First welfare reform experiment on women’s welfare participation decision.

Suggested Citation

  • Denis Nekipelov & Vira Semenova & Vasilis Syrgkanis, 2022. "Regularised orthogonal machine learning for nonlinear semiparametric models [Efficient estimation of models with conditional moment restrictions containing unknown functions]," The Econometrics Journal, Royal Economic Society, vol. 25(1), pages 233-255.
  • Handle: RePEc:oup:emjrnl:v:25:y:2022:i:1:p:233-255.
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    File URL: http://hdl.handle.net/10.1093/ectj/utab022
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    Cited by:

    1. Ganesh Karapakula, 2023. "Stable Probability Weighting: Large-Sample and Finite-Sample Estimation and Inference Methods for Heterogeneous Causal Effects of Multivalued Treatments Under Limited Overlap," Papers 2301.05703, arXiv.org, revised Jan 2023.

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