Pooling in Dynamic Panel-Data Models: An Application to Forecasting GDP Growth Rates

In this article, we analyze issues of pooling models for a given set of N individual units observed over T periods of time. When the parameters of the models are different but exhibit some similarity, pooling may lead to a reduction of the mean squared error of the estimates and forecasts. We investigate theoretically and through simulations the conditions that lead to improved performance of forecasts based on pooled estimates. We show that the superiority of pooled forecasts in small samples can deteriorate as the sample size grows. Empirical results for postwar international real gross domestic product growth rates of 18 Organization for Economic Cooperation and Development countries using a model put forward by Garcia-Ferrer, Highfield, Palm, and Zellner and Hong, among others illustrate these findings. When allowing for contemporaneous residual correlation across countries, pooling restrictions and criteria have to be rejected when formally tested, but generalized least squares (GLS)-based pooled forecasts are found to outperform GLS-based individual and ordinary least squares-based pooled and individual forecasts.

[1]  John F. O. Bilson,et al.  The "Speculative Efficiency" Hypothesis , 1980 .

[2]  Arnold Zellner,et al.  Bayesian and non-Bayesian methods for combining models and forecasts with applications to forecasting international growth rates , 1993 .

[3]  S. Mittnik Macroeconomic Forecasting Using Pooled International Data , 1990 .

[4]  A. Zellner,et al.  Basic Issues in Econometrics. , 1986 .

[5]  F. C. Palm,et al.  Significance tests and spurious correlation in regression models with autocorrelated errors , 1983 .

[6]  James Goodnight,et al.  OPERATIONAL TECHNIQUES AND TABLES FOR MAKING WEAK MSE TESTS FOR RESTRICTIONS IN REGRESSIONS , 1972 .

[7]  D. Lindley,et al.  Bayes Estimates for the Linear Model , 1972 .

[8]  Robert C. Blattberg,et al.  Shrinkage Estimation of Price and Promotional Elasticities: Seemingly Unrelated Equations , 1991 .

[9]  John F. O. Bilson The "Speculative Efficiency" Hypothesis , 1981 .

[10]  A. Zellner,et al.  Forecasting international growth rates using Bayesian shrinkage and other procedures , 1989 .

[11]  T. D. Wallace,et al.  Tables for the Mean Square Error Test for Exact Linear Restrictions in Regression , 1969 .

[12]  Marjorie B. McElroy,et al.  Weaker MSE criteria and tests for linear restrictions in regression models with non-spherical disturbances , 1977 .

[13]  Steven N. Durlauf,et al.  Convergence in International Output , 1995 .

[14]  Siddhartha Chib,et al.  Hierarchical analysis of SUR models with extensions to correlated serial errors and time-varying parameter models☆ , 1995 .

[15]  Balgobin Nandram,et al.  A Bayesian Analysis of Autoregressive Time Series Panel Data , 1997 .

[16]  Adrian Pagan,et al.  The Lagrange Multiplier Test and its Applications to Model Specification in Econometrics , 1980 .

[17]  A. Zellner,et al.  Forecasting turning points in international output growth rates using Bayesian exponentially weighted autoregression, time-varying parameter, and pooling techniques , 1991 .

[18]  Hongyi Li,et al.  Estimation of Short-Run and Long-Run Elasticities of Energy Demand From Panel Data Using Shrinkage Estimators , 1997 .

[19]  T. Wallace,et al.  Weaker Criteria and Tests for Linear Restrictions in Regression , 1972 .

[20]  A. Zellner Time‐series analysis, forecasting and econometric modelling: The structural econometric modelling, time‐series analysis (SEMTSA) approach , 1994 .