References
- Alhamzawi, R., K. Yu, and B. F. Dries. 2012. Bayesian adaptive lasso quantile regression. Statistical Modelling 12 (3):279–297. doi:10.1177/1471082X1101200304.
- Austin, P. C., and M. J. Schull. 2003. Quantile regression: A statistical tool for out-of- hospital research. Academic Emergency Medicine 10 (7):789–797. doi:10.1197/aemj.10.7.789.
- Belloni, A., and V. Chernozhukov. 2011. L1-penalized quantile regression in high- dimensional sparse models. Annals of Statistics 39 (1):82–130. doi:10.1214/10-AOS827.
- Breiman, L. 1995. Better subset regression using the nonnegative garrote. Technometrics 37 (4):373–384. doi:10.1080/00401706.1995.10484371.
- Bühlmann, P., and S. Van De Geer. 2011. Statistics for high-dimensional data: methods, theory and applications. Berlin: Springer Science and Business Media.
- Fan, J., Y. Fan, and E. Barut. 2014. Adaptive robust variable selection. Annals of Statistics 42 (1):324. doi:10.1214/13-AOS1191.
- Fan, J., Y. Feng, and Y. Wu. 2009. Network exploration via the adaptive lasso and scad penalties. The Annals of Applied Statistics 3 (2):521–541. doi:10.1214/08-AOAS215.
- Fan, J., and R. Li. 2001. Variable selection via nonconcave penalized likelihood and its oracle properties. Journal of the American Statistical Association 96 (456):1348–1360. doi:10.1198/016214501753382273.
- Friedman, J., T. Hastie, and R. Tibshirani. 2001. The elements of statistical learning. New York: Springer Series in Statistics.
- Hoerl, A. E., and R. W. Kennard. 1970. Ridge regression: biased estimation for nonorthogonal problems. Technometrics 12 (1):55–67. doi:10.1080/00401706.1970.10488634.
- Johnstone, I. M., and D. M. Titterington. 2009. Statistical challenges of high- dimensional data. Philosophical Transactions of the Royal Society A 367 (1906):4237––4253. doi:10.1098/rsta.2009.0159.
- Knight, K., and W. Fu. 2000. Asymptotics for lasso-type estimators. Annals of Statistics 28 (5):1356–1378. doi:10.1214/aos/1015957397.
- Koenker, R., and G. Bassett. 1978. Regression quantiles. Econometrica: Journal of the Econometric Society 46 (1):33–50. doi:10.2307/1913643.
- Koenker, R., and J. A. Machado. 1999. Goodness of fit and related inference pro- cesses for quantile regression. Journal of the American Statistical Associa- Tion 94 (448):1296–1310. doi:10.1080/01621459.1999.10473882.
- Koenker, R., and I. Mizera. 2014. Convex optimization in R. Journal of Statistical Software 60 (5):1–23. doi:10.18637/jss.v060.i05.
- Li, X., T. Zhao, X. Yuan, and H. Liu. 2015. The flare package for high dimensional linear regression and precision matrix estimation in R. Journal of Machine Learning Research: JMLR 16:553–557.
- Li, Y., and J. Zhu. 2008. L1-norm quantile regression. Journal of Computational and Graphical Statistics 17 (1):163–185. doi:10.1198/106186008X289155.
- Pollard, D. 1991. Asymptotics for least absolute deviation regression estimators. Econometric Theory 7 (2):186–199. doi:10.1017/S0266466600004394.
- R Core Team. 2021. R: A language and environment for statistical computing. Vienna, Austria, URL: R Foundation for Statistical Computing. https://www.R-project.org/.
- Scheetz, T., K. Y. Kim, R. Swiderski, A. Philp, T. Braun, K. Knudtson, A. Dorrance, G. DiBona, J. Huang, T. Casavant, et al. 2006. Regulation of gene expression in the mammalian eye and its relevance to eye disease. Proceedings of the National Academy of Sciences 103(39):14429–14434
- Sherwood, B., A. Maidman, M. B. Sherwood, and T. ByteCompile. 2017. rqPen: Penalized Quantile Regression. R package version 2.2.2. https://CRAN.R-project.org/package=rqPen.
- Tibshirani, R. 1996. Regression shrinkage and selection via the lasso. Journal of the Royal Statistical Society: Series B (Methodological) 58 (1):267–288. doi:10.1111/j.2517-6161.1996.tb02080.x.
- Tibshirani, R. 2011. Regression shrinkage and selection via the lasso: A retrospective. Journal of the Royal Statistical Society: Series B (Statistical Methodology) 73 (3):273–282. doi:10.1111/j.1467-9868.2011.00771.x.
- Wang, H., G. Li, and G. Jiang. 2007. Robust regression shrinkage and consistent variable selection through the lad-lasso. Journal of Business and Economic Statistics 25 (3):347–355. doi:10.1198/073500106000000251.
- Wang, S., and L. Xiang. 2017. Two-layer em algorithm for ald mixture regression models: A new solution to composite quantile regression. Computational Statistics & Data Analysis 115:136–154. doi:10.1016/j.csda.2017.06.002.
- Wu, Y., and Y. Liu. 2009. Variable selection in quantile regression. Statistica Sinica 19 (2):801–817.
- Yuan, M., and Y. Lin. 2007. On the non-negative garrotte estimator. Journal of the Royal Statistical Society: Series B (Statistical Methodology) 69 (2):143–161. doi:10.1111/j.1467-9868.2007.00581.x.
- Yu, K., and R. A. Moyeed. 2001. Bayesian quantile regression. Statistics & Probability Letters 54 (4):437–447. doi:10.1016/S0167-7152(01)00124-9.
- Zhao, P., and B. Yu. 2006. On model selection consistency of lasso. Journal of Machine Learning Research 7 (Nov):2541–2563.
- Zheng, Q., L. Peng, and X. He. 2015. Globally adaptive quantile regression with ultra-high dimensional data. Annals of Statistics 43 (5):2225. doi:10.1214/15-AOS1340.
- Zou, H. 2006. The adaptive lasso and its oracle properties. Journal of the American Statistical Association 101 (476):1418–1429. doi:10.1198/016214506000000735.