Estimation of Production Functions: Random Effects in Panel Data

1. Estimation of Production Functions: Random Effects in Panel Data Lecture IX

2. Basic Setup • Regression analysis typically assumes that a large number of factors affect the value of the dependent variable, while some of the variables are measured directly in the model the remaining variables can be summarized by a random distribution Lecture IX

3. When “numerous observations” on individuals are observed over time, it is assumed that some of the omitted variables represent factors peculiar to individual and time periods. • Going back to the panel specification Lecture IX

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6. The variance of yit on xit based on the assumption above is • Thus, this kind of model is typically referred to as a variance-component (or error-components) model. Lecture IX

7. Letting the panel estimation model can be written in vector form as Lecture IX

8. The expected value of the residual becomes Lecture IX

9. Using the basic covariance estimator • Whether αi is fixed or random the covariance estimator is unbiased. • However, if the αi is random the covariance estimator is not the best linear unbiased estimator (BLUE). • Instead, a BLUE estimator can be derived using generalized least squares (GLS). Lecture IX

10. The Generalized-Least-Squares Estimator • Because both uit and uis contain αi , they are correlated. Lecture IX

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12. A procedure for estimation Lecture IX

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14. This looks bad, but think about Lecture IX

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16. Solving this system yields Lecture IX

17. Using the inverse of a partitioned matrix Lecture IX

18. Where • Where βb is the between estimator. Lecture IX

19. The variance of the estimator can be written as Lecture IX

20. 3. Given that we don’t know ψa priori, we estimate Lecture IX