Partially adaptive quantile estimators |
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Authors: | David J Mauler James B McDonald Logan C Tatham |
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Institution: | Department of Economics, Brigham Young University, Provo, UT, USA |
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Abstract: | This paper contrasts two approaches to estimating quantile regression models: traditional semi-parametric methods and partially adaptive estimators using flexible probability density functions (pdfs). While more general pdfs could have been used, the skewed Laplace was selected for pedagogical purposes. Monte Carlo simulations are used to compare the behavior of the semi-parametric and partially adaptive quantile estimators in the presence of possibly skewed and heteroskedastic data. Both approaches accommodate skewness and heteroskedasticity which are consistent with linear quantiles; however, the partially adaptive estimator considered allows for non linear quantiles and also provides simple tests for symmetry and heteroskedasticity. The methods are applied to the problem of estimating conditional quantile functions for wages corresponding to different levels of education. |
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Keywords: | Semi-parametric Skewed Laplace Skewness Heteroskedasticity Monte Carlo |
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