Identification and Estimation of 'Irregular' Correlated Random Coefficient Models

50 Pages Posted: 11 Nov 2008 Last revised: 16 Jul 2022

See all articles by Bryan S. Graham

Bryan S. Graham

University of California, Berkeley - Department of Economics; National Bureau of Economic Research (NBER)

James L. Powell

University of California, Berkeley

Date Written: November 2008

Abstract

In this paper we study identification and estimation of a correlated random coefficients (CRC) panel data model. The outcome of interest varies linearly with a vector of endogenous regressors. The coefficients on these regressors are heterogenous across units and may covary with them. We consider the average partial effect (APE) of a small change in the regressor vector on the outcome (cf., Chamberlain, 1984; Wooldridge, 2005a). Chamberlain (1992) calculates the semiparametric efficiency bound for the APE in our model and proposes a √N consistent estimator. Nonsingularity of the APE's information bound, and hence the appropriateness of Chamberlain's (1992) estimator, requires (i) the time dimension of the panel (T) to strictly exceed the number of random coefficients (p) and (ii) strong conditions on the time series properties of the regressor vector. We demonstrate irregular identification of the APE when T = p and for more persistent regressor processes. Our approach exploits the different identifying information in the subpopulations of 'stayers' -- or units whose regressor values change little across periods -- and 'movers' -- or units whose regressor values change substantially across periods. We propose a feasible estimator based on our identification result and characterize its large sample properties. While irregularity precludes our estimator from attaining parametric rates of convergence, it limiting distribution is normal and inference is straightforward to conduct. Standard software may be used to compute point estimates and standard errors. We use our methods to estimate the average elasticity of calorie consumption with respect to total outlay for a sample of poor Nicaraguan households.

Suggested Citation

Graham, Bryan S. and Powell, James L., Identification and Estimation of 'Irregular' Correlated Random Coefficient Models (November 2008). NBER Working Paper No. w14469, Available at SSRN: https://ssrn.com/abstract=1297699

Bryan S. Graham (Contact Author)

University of California, Berkeley - Department of Economics ( email )

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National Bureau of Economic Research (NBER)

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James L. Powell

University of California, Berkeley

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Berkeley, CA 94720
United States