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Asymptotic Properties of Empirical Quantile-Based Estimators

Author

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  • Julien Chhor
  • Xavier D'Haultf{oe}uille
  • J'er'emy L'Hour
  • Martin Mugnier

Abstract

We consider inference for parameters of the form $\theta_0 = E[F_Y^{-1}\circ F_Z(X)]$ for some variables $X$, $Y$ and $Z$. Such parameters appear, in particular, in the ``changes-in-changes'' model of \cite{AtheyImbens2006}. We first establish that $\widehat{\theta}$, a plug-in estimator of $\theta_0$, is root-$n$ consistent and asymptotically normal under weaker conditions than those previously available, allowing in particular for unbounded variables. Next, we propose a new estimator of the asymptotic variance of $\widehat{\theta}$ and show its consistency, also allowing for unbounded variables. Monte Carlo simulations suggest that the conditions for root-$n$ consistency and asymptotic normality are, in some sense, minimal. These simulations highlight that our variance estimator also leads to more accurate inference than some alternative approaches.

Suggested Citation

  • Julien Chhor & Xavier D'Haultf{oe}uille & J'er'emy L'Hour & Martin Mugnier, 2026. "Asymptotic Properties of Empirical Quantile-Based Estimators," Papers 2607.00219, arXiv.org.
  • Handle: RePEc:arx:papers:2607.00219
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    File URL: https://arxiv.org/pdf/2607.00219
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