题 目: Robust Regression Shrinkage and Consistent Variable Selection via the LAD-Lasso
时 间: 3月22日(周三)3:30-5:00pm
Abstract: The least absolute deviation (LAD) regression is a useful method for robust regression while the least absolute shrinkage and selection
operator (lasso) is a popular choice for shrinkage estimation and
variable selection. In this article, we attempt to combine these two
classical ideas together to produce LAD-lasso. Compared with the LAD
regression, LAD-lasso can do parameter estimation and variable selection
simultaneously. Compared with the traditional lasso, LAD-lasso is resistant to heavy-tailed errors or outliers in the response. Furthermore, with easily estimated tuning parameters, the LAD-lasso estimator enjoys the same asymptotic efficiency as the unpenalized LAD estimator obtained under the {it true} model (i.e. the oracle property). Extensive simulation studies demonstrate the satisfactory finite sample performance of LAD-lasso and a real example is analyzed for illustration purpose.
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