Locally Robust Semiparametric Estimation

Victor Chernozhukov, Juan Carlos Escanciano, Hidehiko Ichimura, Whitney K. Newey, James M. Robins

Research output: Contribution to journalArticlepeer-review

45 Scopus citations

Abstract

Many economic and causal parameters depend on nonparametric or high dimensional first steps. We give a general construction of locally robust/orthogonal moment functions for GMM, where first steps have no effect, locally, on average moment functions. Using these orthogonal moments reduces model selection and regularization bias, as is important in many applications, especially for machine learning first steps. Also, associated standard errors are robust to misspecification when there is the same number of moment functions as parameters of interest. We use these orthogonal moments and cross-fitting to construct debiased machine learning estimators of functions of high dimensional conditional quantiles and of dynamic discrete choice parameters with high dimensional state variables. We show that additional first steps needed for the orthogonal moment functions have no effect, globally, on average orthogonal moment functions. We give a general approach to estimating those additional first steps. We characterize double robustness and give a variety of new doubly robust moment functions. We give general and simple regularity conditions for asymptotic theory.

Original languageEnglish (US)
Pages (from-to)1501-1535
Number of pages35
JournalEconometrica
Volume90
Issue number4
DOIs
StatePublished - Jul 2022

Keywords

  • GMM
  • Local robustness
  • bias
  • double robustness
  • orthogonal moments
  • semiparametric estimation

ASJC Scopus subject areas

  • Economics and Econometrics

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