1 / 34

Topics in Microeconometrics Professor William Greene Stern School of Business, New York University

Topics in Microeconometrics Professor William Greene Stern School of Business, New York University at Curtin Business School Curtin University Perth July 22-24, 2013. 5. Panel Data. Panel Data. Main Issues in Panel Data Modeling. Issues Capturing Time Invariant Effects

blade
Download Presentation

Topics in Microeconometrics Professor William Greene Stern School of Business, New York University

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Topics in Microeconometrics Professor William Greene Stern School of Business, New York University at Curtin Business School Curtin University Perth July 22-24, 2013

  2. 5. Panel Data

  3. Panel Data

  4. Main Issues in Panel Data Modeling • Issues • Capturing Time Invariant Effects • Dealing with Time Variation in Inefficiency • Separating Heterogeneity from Inefficiency • Contrasts – Panel Data vs. Cross Section

  5. Familiar RE and FE Models • Wisdom from the linear model • FE: y(i,t) = f[x(i,t)] + a(i) + e(i,t) • What does a(i) capture? • Nonorthogonality of a(i) and x(i,t) • The LSDV estimator • RE: y(i,t) = f[x(i,t)] + u(i) + e(i,t) • How does u(i) differ from a(i)? • Generalized least squares and maximum likelihood • What are the time invariant effects?

  6. Frontier Model for Panel Data • y(i,t) = β’x(i,t) – u(i) +v(i,t) • Effects model with time invariant inefficiency • Same dichotomy between FE and RE – correlation with x(i,t). • FE case is completely unlike the assumption in the cross section case

  7. Pitt and Lee RE Model

  8. Estimating Efficiency

  9. Schmidt and Sickles FE Model lnyit=  + β’xit + ai+ vit estimated by least squares (‘within’)

  10. A Problem of Heterogeneity In the “effects” model, u(i) absorbs two sources of variation • Time invariant inefficiency • Time invariant heterogeneity unrelated to inefficiency

  11. Time Invariant Heterogeneity

  12. A True RE Model

  13. Kumbhakar et al. (2011) – True True RE yit = b0 + b’xit + (ei0 + eit) - (ui0 + uit) ei0 and eit full normally distributed ui0 and uit half normally distributed (So far, only one application) Colombi, Kumbhakar, Martini, Vittadini, “A Stochastic Frontier with Short Run and Long Run Inefficiency, 2011

  14. A True FE Model

  15. Schmidt et al. (2011) – Results on TFE • Problem of TFE model – incidental parameters problem. • Where is the bias? Estimator of u • Is there a solution? • Not based on OLS • Chen, Schmidt, Wang: MLE for data in group mean deviation form

  16. Moving Heterogeneity Out of Inefficiency World Health Organization study of life expectancy (DALE) and composite health care delivery (COMP)

  17. Observable Heterogeneity

  18. Heteroscedasticity

  19. Unobservable Heterogeneity - RPM Random variation in production functions and inefficiency distributions across firms Continuous variation: Random parameters models Discrete variation: Latent Class models

  20. Parameter Heterogeneity in Banks

  21. Time Variation – Early Ideas Kumbhakar and Hjalmarsson (1995) uit = i + ait where ait ~ N+[0,2]. They suggested a two step estimation procedure that begins either with OLS/dummy variables or feasible GLS, and proceeds to a second step analysis to estimate i. Cornwell et al. (1990) propose to accommodate systematic variation in inefficiency, by replacing ai with ait = i0 + i1t + i2t2. Inefficiency is still modeled using uit = max(ait) – ait.

  22. Time Variation in Random EffectsBattese and Coelli

  23. Battese and Coelli Models

  24. Variations on Battese and Coelli • (There are many) • Farsi, M. JPA, 30,2, 2008.

  25. A Distance Function Approach http://www.young-demography.org/docs/08_kriese_efficiency.pdf

  26. Kriese Study of Municipalities

More Related