 Penalized estimation of high-dimensional models under a generalized sparsity conditionJoel L. Horowitz and Jian Huang No 17/12, CeMMAP working papers from Institute for Fiscal Studies Abstract: We consider estimation of a linear or nonparametric additive model in which a few coefficients or additive components are "large" and may be objects of substantive interest, whereas others are "small" but not necessarily zero. The number of small coefficients or additive components may exceed the sample size. It is not known which coefficients or components are large and which are small. The large coefficients or additive components can be estimated with a smaller mean-square error or integrated mean-square error if the small ones can be identified and the covariates associated with them dropped from the model. We give conditions under which several penalized least squares procedures distinguish correctly between large and small coefficients or additive components with probability approaching 1 as the sample size increases. The results of Monte Carlo experiments and an empirical example illustrate the benefits of our methods. Date: 2012-07-23 Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:azt:cemmap:17/12 Access Statistics for this paper More papers in CeMMAP working papers from Institute for Fiscal Studies Contact information at EDIRC. |
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