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Intercept Estimation In Nonlinear Selection Models

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  • Arulampalam, Wiji
  • Corradi, Valentina
  • Gutknecht, Daniel

Abstract

We propose various semiparametric estimators for nonlinear selection models, where slope and intercept can be separately identified. When the selection equation satisfies a monotonic index restriction, we suggest a local polynomial estimator, using only observations for which the marginal cumulative distribution function of the instrument index is close to one. Data-driven procedures such as cross-validation may be used to select the bandwidth for this estimator. We then consider the case in which the monotonic index restriction does not hold and/or the set of observations with a propensity score close to one is thin so that convergence occurs at a rate that is arbitrarily close to the cubic rate. We explore the finite sample behavior in a Monte Carlo study and illustrate the use of our estimator using a model for count data with multiplicative unobserved heterogeneity.

Suggested Citation

  • Arulampalam, Wiji & Corradi, Valentina & Gutknecht, Daniel, 2024. "Intercept Estimation In Nonlinear Selection Models," Econometric Theory, Cambridge University Press, vol. 40(6), pages 1311-1363, December.
    • Handle: RePEc:cup:etheor:v:40:y:2024:i:6:p:1311-1363_3
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