Document de travail

Smooth Minimum Distance Estimation and Testing with Conditional Estimating Equations: Uniform in Bandwidth Theory

Pascal Lavergne et Valentin Patilea

Résumé

We study the influence of a bandwidth parameter in inference with conditional estimating equations. In that aim, we propose a new class of smooth minimum distance estimators and we develop a theory that focuses on uniformity in bandwidth. We establish a vn-asymptotic representation of our estimator as a process indexed by a bandwidth that can vary within a wide range including bandwidths independent of the sample size. We develop an efficient version of our estimator. We also study its behavior in misspecified models. We develop a procedure based on a distance metric statistic for testing restrictions on parameters as well as a bootstrap technique to account for the bandwidth’s influence. Our new methods are simple to implement, apply to non-smooth problems, and perform well in our simulations.

Mots-clés

Semiparametric Estimation; Conditional Estimating Equations; Smoothing Methods; Asymptotic Efficiency; Hypothesis Testing; Bootstrap;

Codes JEL

  • C12: Hypothesis Testing: General
  • C14: Semiparametric and Nonparametric Methods: General

Remplacé par

Pascal Lavergne et Valentin Patilea, « Smooth Minimum Distance Estimation and Testing with Conditional Estimating Equations: Uniform in Bandwidth Theory », Journal of Econometrics, vol. 177, n° 1, novembre 2013, p. 47–59.

Référence

Pascal Lavergne et Valentin Patilea, « Smooth Minimum Distance Estimation and Testing with Conditional Estimating Equations: Uniform in Bandwidth Theory », TSE Working Paper, n° 13-404, mars 2013.

Voir aussi

Publié dans

TSE Working Paper, n° 13-404, mars 2013