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dc.contributor.authorDette, Holger-
dc.contributor.authorKonstantinou, Maria-
dc.contributor.authorSchorning, Kirsten-
dc.contributor.authorGösmann, Josua-
dc.date.accessioned2017-11-08T09:29:23Z-
dc.date.available2017-11-08T09:29:23Z-
dc.date.issued2017-
dc.identifier.urihttp://hdl.handle.net/2003/36168-
dc.identifier.urihttp://dx.doi.org/10.17877/DE290R-18184-
dc.description.abstractIn this paper optimal designs for regression problems with spherical predictors of arbitrary dimension are considered. Our work is motivated by applications in material sciences, where crystallographic textures such as the missorientation distribution or the grain boundary distribution (depending on a four dimensional spherical predictor) are represented by series of hyperspherical harmonics, which are estimated from experimental or simulated data. For this type of estimation problems we explicitly determine optimal designs with respect to Kiefers op-criteria and a class of orthogonally invariant information criteria recently introduced in the literature. In particular, we show that the uniform distribution on the m-dimensional sphere is optimal and construct discrete and implementable designs with the same information matrices as the continuous optimal designs. Finally, we illustrate the advantages of the new designs for series estimation by hyperspherical harmonics, which are symmetric with respect to the first and second crystallographic point group.en
dc.language.isoende
dc.relation.ispartofseriesDiscussion Paper / SFB823;20/2017en
dc.subject.ddc310-
dc.subject.ddc330-
dc.subject.ddc620-
dc.titleOptimal designs for regression with spherical dataen
dc.typeTextde
dc.type.publicationtypeworkingPaperde
dcterms.accessRightsopen access-
eldorado.secondarypublicationfalsede
Appears in Collections:Sonderforschungsbereich (SFB) 823

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