posted on 2009-08-18, 15:52authored byGary Koop, Justin Tobias
We describe procedures for Bayesian estimation and testing in both cross sectional and longitudinal
data smooth coefficient models (with and without endogeneity problems). The smooth
coefficient model is a generalization of the partially linear or additive model wherein coefficients
on linear explanatory variables are treated as unknown functions of an observable covariate. In
the approach we describe, points on the regression lines are regarded as unknown parameters and
priors are placed on differences between adjacent points to introduce the potential for smoothing
the curves. The algorithms we describe are quite simple to implement - estimation, testing and
smoothing parameter selection can be carried out analytically in the cross-sectional smooth coefficient
model, and estimation in the hierarchical models only involves simulation from standard
distributions.
We apply our methods by fitting several hierarchical models using data from the National Longitudinal
Survey of Youth (NLSY). We explore the relationship between ability and log wages and
flexibly model how returns to schooling vary with measured cognitive ability. In a generalization of
this model, we also permit endogeneity of schooling and describe simulation-based methods for inference
in the presence of the endogeneity problem. We find returns to schooling are approximately
constant throughout the ability support and that simpler (and often used) parametric specifications
provide an adequate description of these relationships.