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VARIABLE SELECTION IN QUANTILE REGRESSION

Yichao Wu, Yufeng Liu

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Abstract

After its inception in Koenker and Bassett (1978), quantile regression has become an important and widely used technique to study the whole conditional distribution of a response variable and grown into an important tool of applied statistics over the last three decades. In this work, we focus on the variable se-lection aspect of penalized quantile regression. Under some mild conditions, we demonstrate the oracle properties of the SCAD and adaptive-LASSO penalized quantile regressions. For the SCAD penalty, despite its good asymptotic proper-ties, the corresponding optimization problem is non-convex and, as a result, much harder to solve. In this work, we take advantage of the decomposition of the SCAD penalty function as the difference of two convex functions and propose to solve the corresponding optimization using the Difference Convex Algorithm (DCA).

Topics & Concepts

Quantile regressionStatisticsSelection (genetic algorithm)Feature selectionCross-sectional regressionEconometricsVariable (mathematics)Regression analysisComputer scienceMathematicsArtificial intelligencePolynomial regressionMathematical analysisStatistical Methods and InferenceAdvanced Statistical Methods and ModelsControl Systems and Identification
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