Kernel density based linear regression estimate

dc.citation.doidoi:10.1080/03610926.2011.650269en_US
dc.citation.epage4512en_US
dc.citation.issue24en_US
dc.citation.jtitleCommunications in Statistics - Theory and Methodsen_US
dc.citation.spage4499en_US
dc.citation.volume42en_US
dc.contributor.authorYao, Weixin
dc.contributor.authorZhao, Zhibiao
dc.contributor.authoreidwxyaoen_US
dc.date.accessioned2014-03-10T19:58:29Z
dc.date.available2014-03-10T19:58:29Z
dc.date.issued2014-03-10
dc.date.published2013en_US
dc.description.abstractFor linear regression models with non normally distributed errors, the least squares estimate (LSE) will lose some efficiency compared to the maximum likelihood estimate (MLE). In this article, we propose a kernel density-based regression estimate (KDRE) that is adaptive to the unknown error distribution. The key idea is to approximate the likelihood function by using a nonparametric kernel density estimate of the error density based on some initial parameter estimate. The proposed estimate is shown to be asymptotically as efficient as the oracle MLE which assumes the error density were known. In addition, we propose an EM type algorithm to maximize the estimated likelihood function and show that the KDRE can be considered as an iterated weighted least squares estimate, which provides us some insights on the adaptiveness of KDRE to the unknown error distribution. Our Monte Carlo simulation studies show that, while comparable to the traditional LSE for normal errors, the proposed estimation procedure can have substantial efficiency gain for non normal errors. Moreover, the efficiency gain can be achieved even for a small sample size.en_US
dc.identifier.urihttp://hdl.handle.net/2097/17210
dc.language.isoen_USen_US
dc.relation.urihttp://www.tandfonline.com/doi/full/10.1080/03610926.2011.650269#.UxjwEj9dXL8en_US
dc.rightsThis is an electronic version of an article published in Communications in Statistics - Theory and Methods, 42(24), 4499-4512. Communications in Statistics - Theory and Methods is available online at: http://www.tandfonline.com/doi/full/10.1080/03610926.2011.650269#.UxjwEj9dXL8en_US
dc.subjectEM algorithmen_US
dc.subjectKernel density estimateen_US
dc.subjectLeast squares estimateen_US
dc.subjectLinear regressionen_US
dc.subjectMaximum likelihood estimateen_US
dc.titleKernel density based linear regression estimateen_US
dc.typeArticle (author version)en_US

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