Title of article
Limit theory for panel data models with cross sectional dependence and sequential exogeneity
Author/Authors
Kuersteiner، نويسنده , , Guido M. and Prucha، نويسنده , , Ingmar R.، نويسنده ,
Issue Information
دوفصلنامه با شماره پیاپی سال 2013
Pages
20
From page
107
To page
126
Abstract
The paper derives a general Central Limit Theorem (CLT) and asymptotic distributions for sample moments related to panel data models with large n . The results allow for the data to be cross sectionally dependent, while at the same time allowing the regressors to be only sequentially rather than strictly exogenous. The setup is sufficiently general to accommodate situations where cross sectional dependence stems from spatial interactions and/or from the presence of common factors. The latter leads to the need for random norming. The limit theorem for sample moments is derived by showing that the moment conditions can be recast such that a martingale difference array central limit theorem can be applied. We prove such a central limit theorem by first extending results for stable convergence in Hall and Heyde (1980) to non-nested martingale arrays relevant for our applications. We illustrate our result by establishing a generalized estimation theory for GMM estimators of a fixed effect panel model without imposing i.i.d. or strict exogeneity conditions. We also discuss a class of Maximum Likelihood (ML) estimators that can be analyzed using our CLT.
Keywords
Cross-sectional dependence , Spatial martingale difference sequence , panel , Multinomial choice , MLE , Social Interaction , Central Limit Theorem , GMM , Spatial
Journal title
Journal of Econometrics
Serial Year
2013
Journal title
Journal of Econometrics
Record number
2129270
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