Abstract
We propose a Quasi-Bayesian nonparametric approach to estimating the structural relationship ' among endogenous variables when instruments are available. We show that the posterior distribution of ' is inconsistent in the frequentist sense. We interpret this fact as the ill-posedness of the Bayesian inverse problem defined by the relation that characterizes the structural function '. To solve this problem, we construct a regularized posterior distribution, based on a Tikhonov regularization of the inverse of the marginal variance of the sample, which is justified by a penalized projection argument. This regularized posterior distribution is consistent in the frequentist sense and its mean can be interpreted as the mean of the exact posterior distribution resulting from a gaussian prior distribution with a shrinking covariance operator.
JEL codes
- C11: Bayesian Analysis: General
- C14: Semiparametric and Nonparametric Methods: General
- C30: General
Replaces
Reference
Jean-Pierre Florens, and Anna Simoni, “Nonparametric Estimation of An Instrumental Regression: A Quasi-Bayesian Approach Based on Regularized Posterior”, Journal of Econometrics, vol. 170, n. 2, October 2012, pp. 458–475.
Published in
Journal of Econometrics, vol. 170, n. 2, October 2012, pp. 458–475