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Communications in Statistics - Theory and Methods Volume 47, 2018 - Issue 7
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Original Articles

Variable selection in expectile regression

Jun ZhaoSchool of Mathematical Sciences, Zhejiang University, Hangzhou, P. R. China
&
Yi ZhangSchool of Mathematical Sciences, Zhejiang University, Hangzhou, P. R. ChinaCorrespondence[email protected]
Pages 1731-1746 | Received 22 Nov 2016, Accepted 25 Apr 2017, Published online: 27 Sep 2017

References

  • Aigner, D. J., T. Amemiya, and D. J. Poirier. 1976. On the estimation of production frontiers: maximum likelihood estimation of the parameters of a discontinuous density function. International Economic Review 17 (2):377–396.
  • Breckling, J., and R. Chambers. 1988. M-quantiles. Biometrika 75 (4):761–71.
  • Fan, J., Y. Fan, and E. Barut. 2014. Adaptive robust variable selection. Annals of Statistics 42 (1):324.
  • Fan, J., and R. Li. 2001. Variable selection via nonconcave penalized likelihood and its oracle properties. Journal of the American statistical Association 96 (456):1348–60.
  • Jones, M. C. 1994. Expectiles and M-quantiles are quantiles. Statistics Probability Letters 20 (2):149–53.
  • Harrison, D., and D. L. Rubinfeld. 1978. Hedonic housing prices and the demand for clean air. Journal of Environmental Economics and Management 5 (1):81–102.
  • Newey, W. K., and J. L. Powell. 1987. Asymmetric least squares estimation and testing. Econometrica: Journal of the Econometric Society 55 (4):819–47.
  • Pollard, D. 1991. Asymptotics for least absolute deviation regression estimators. Econometric Theory 7 (2):186–99.
  • Pratesi, M., M. G. Ranalli, and N. Salvati. 2009. Nonparametric M-quantile regression using penalised splines. Journal of Nonparametric Statistics 21 (3):287–304.
  • Schnabel, S. K., and P. H. Eilers. 2009. Optimal expectile smoothing. Computational Statistics Data Analysis 53 (12):4168–77.
  • Sobotka, F., and T. Kneib. 2012. Geoadditive expectile regression. Computational Statistics Data Analysis 56 (4):755–67.
  • Tibshirani, R. 1996. Regression shrinkage and selection via the lasso. Journal of the Royal Statistical Society. Series B (Methodological) 58 (1):267–288.
  • Van de Geer, S., P. Bhlmann, Y. A. Ritov, and R. Dezeure. 2014. On asymptotically optimal confidence regions and tests for high-dimensional models. The Annals of Statistics 42 (3):1166–202.
  • Waltrup, L. S., F. Sobotka, T. Kneib, and G. Kauermann. 2015. Expectile and quantile regression David and Goliath? Statistical Modelling 15 (5):433–56.
  • Wu, Y., and Y. Liu. 2009. Variable selection in quantile regression. Statistica Sinica 19 (2):801–17.
  • Yao, Q., and H. Tong. 1996. Asymmetric least squares regression estimation: A nonparametric approach. Journal of Nonparametric Statistics 6 (2–3):273–92.
  • Ziegel, J. F. 2014. Coherence and elicitability. Mathematical Finance. 26 (4):901–18.
  • Zou, H. 2006. The adaptive lasso and its oracle properties. Journal of the American Statistical Association 101 (476):1418–29.

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