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Waldmann, Elisabeth [Verfasser:in]; Kneib, Thomas [Verfasser:in]; Yu, Yu Ryan [Verfasser:in]; Lang, Stefan [Verfasser:in]

Bayesian semiparametric additive quantile regression

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  • Medientyp: Bericht; E-Book
  • Titel: Bayesian semiparametric additive quantile regression
  • Beteiligte: Waldmann, Elisabeth [Verfasser:in]; Kneib, Thomas [Verfasser:in]; Yu, Yu Ryan [Verfasser:in]; Lang, Stefan [Verfasser:in]
  • Erschienen: Innsbruck: University of Innsbruck, Research Platform Empirical and Experimental Economics (eeecon), 2012
  • Sprache: Englisch
  • Schlagwörter: asymmetric Laplace distribution ; Dirichlet process mixtures ; LASSO ; P-splines ; Bayesian quantile regression
  • Entstehung:
  • Anmerkungen: Diese Datenquelle enthält auch Bestandsnachweise, die nicht zu einem Volltext führen.
  • Beschreibung: Quantile regression provides a convenient framework for analyzing the impact of covariates on the complete conditional distribution of a response variable instead of only the mean. While frequentist treatments of quantile regression are typically completely nonparametric, a Bayesian formulation relies on assuming the asymmetric Laplace distribution as auxiliary error distribution that yields posterior modes equivalent to frequentist estimates. In this paper, we utilize a location-scale-mixture of normals representation of the asymmetric Laplace distribution to transfer different flexible modeling concepts from Gaussian mean regression to Bayesian semiparametric quantile regression. In particular, we will consider high-dimensional geoadditive models comprising LASSO regularization priors and mixed models with potentially non-normal random effects distribution modeled via a Dirichlet process mixture. These extensions are illustrated using two large-scale applications on net rents in Munich and longitudinal measurements on obesity among children.
  • Zugangsstatus: Freier Zugang