Abstract
Transition from economic theory to a testable form of model invariably involves the use of certain "simplifying assumptions." If, however, these are not valid, misspecified models result. This article considers estimation of the dynamic linear panel data model, which often forms the basis of testable economic hypotheses. The estimators of such a model are frequently similarly based on certain assumptions which appear to be often untenable in practice. Here, the performance of these estimators is analyzed in scenarios where the theoretically required conditions are not met. Specifically, we consider three such instances of serial correlation of the idiosyncratic disturbance terms; correlation of the idiosyncratic disturbance terms and explanatory variables; and, finally, cross-sectional dependence (as a robustness check to these findings, we also consider correlations between observed and unobserved heterogeneity terms). The major findings are that the limited tests readily available tend to have poor power properties and that estimators' performance varies greatly across scenarios. In such a wide array of experiments, it is difficult to pick-out just one "winner." However, a robust estimator across all experiments and parameter settings was a variant of the Wansbeek–Bekker estimator. This is a significant finding, as this estimator is infrequently used in practice. When the experiments are extended to include correlations between observed and unobserved heterogeneity terms, one might also consider, for across-the-board performance, the Blundell and Bond estimator.
Highlights
Ever since the pioneering work of Balestra and Nerlove (1966), the estimation of dynamic error components panel data models has been at the fore of applied econometrics research.' The econometric interest in such models results from the fact that the usual estimation techniques (Ordinary Least Squares - OLS, Feasible Generalised Least Squares - FGLS and the Within estimators) are all biased and inconsistent in typical panel data sets i.e., those with small time series components but a large cross-sectional one
Numerous semi-consistent estimators have been proposed in the literature, generally comprising of Instrumental Variables (IV)and Generalised Method of Moments(GMM)estimators
In analysing the results for the experiments, we focus on Mean Squared Errors (MSE's) of the estimation of 3in jointly assessing the estimators' performance both in terms of bias and variance
Summary
Ever since the pioneering work of Balestra and Nerlove (1966), the estimation of dynamic error components panel data models has been at the fore of applied econometrics research.' The econometric interest in such models results from the fact that the usual estimation techniques (Ordinary Least Squares - OLS, Feasible Generalised Least Squares - FGLS and the Within estimators) are all biased and inconsistent in typical panel data sets i.e., those with small time series components but a large cross-sectional one This is true for both the random and fixed effects specifications(Kiviet[1995]Sevestre and Trognon[1985]and Nickell[1981]).
Sign-in/Register to view highlights & summary 
Submitted Version (
Free)
Published Version
Talk to us
Join us for a 30 min session where you can share your feedback and ask us any queries you have
Schedule a call