Multivariate quantiles and multiple-output regression quantiles

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dc.contributor.authorHallin, Marcde
dc.contributor.authorPaindaveine, Davyde
dc.contributor.authorSiman, Miroslavde
dc.date.accessioned2009-10-29T10:21:40Z
dc.date.available2009-10-29T10:21:40Z
dc.date.issued2009de
dc.description.abstractA new multivariate concept of quantile, based on a directional version of Koenker and Bassett s traditional regression quantiles, is introduced for multivariate location and multiple-output regression problems. In their empirical version, those quantiles can be computed efficiently via linear programming techniques. Consistency, Bahadur representation and asymptotic normality results are established. Most importantly, the contours generated by those quantiles are shown to coincide with the classical halfspace depth contours associated with the name of Tukey. This relation does not only allow for efficient depth contour computations by means of parametric linear programming, but also for transferring from the quantile to the depth universe such asymptotic results as Bahadur representations. Finally, linear programming duality opens the way to promising developments in depth-related multivariate rank-based inference.en
dc.identifier.urihttp://hdl.handle.net/2003/26494
dc.identifier.urihttp://dx.doi.org/10.17877/DE290R-12663
dc.language.isoende
dc.relation.ispartofseriesDiscussion Paper / SFB 823; 22/2009de
dc.subjecthalfspace depthen
dc.subjectmultivariate quantilesen
dc.subjectquantile regressionen
dc.subject.ddc310de
dc.subject.ddc330de
dc.subject.ddc620de
dc.titleMultivariate quantiles and multiple-output regression quantilesen
dc.title.alternativeFrom L_1 optimization to halfspace depthen
dc.typeTextde
dc.type.publicationtypereportde
dcterms.accessRightsopen access

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