Fremdt, Stefan, Horvath, Lajos ORCID: 0000-0001-8594-4972, Kokoszka, Piotr and Steinebach, Josef G. (2014). Functional data analysis with increasing number of projections. J. Multivar. Anal., 124. S. 313 - 333. SAN DIEGO: ELSEVIER INC. ISSN 0047-259X

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Abstract

Functional principal components (FPC's) provide the most important and most extensively used tool for dimension reduction and inference for functional data. The selection of the number, d, of the FPC's to be used in a specific procedure has attracted a fair amount of attention, and a number of reasonably effective approaches exist. Intuitively, they assume that the functional data can be sufficiently well approximated by a projection onto a finite-dimensional subspace, and the error resulting from such an approximation does not impact the conclusions. This has been shown to be a very effective approach, but it is desirable to understand the behavior of many inferential procedures by considering the projections on subspaces spanned by an increasing number of the FPC's. Such an approach reflects more fully the infinite-dimensional nature of functional data, and allows to derive procedures which are fairly insensitive to the selection of d. This is accomplished by considering limits as d -> infinity with the sample size. We propose a specific framework in which we let d -> infinity by deriving a normal approximation for the partial sum process (GRAPHICS) 0 <= u <= 1, 0 <= x <= 1, where N is the sample size and xi i.j is the score of the ith function with respect to the jth FPC. Our approximation can be used to derive statistics that use segments of observations and segments of the FPC's. We apply our general results to derive two inferential procedures for the mean function: a change-point test and a two-sample test. In addition to the asymptotic theory, the tests are assessed through a small simulation study and a data example. (C) 2013 Elsevier Inc. All rights reserved.

Item Type: Journal Article
Creators:
CreatorsEmailORCIDORCID Put Code
Fremdt, StefanUNSPECIFIEDUNSPECIFIEDUNSPECIFIED
Horvath, LajosUNSPECIFIEDorcid.org/0000-0001-8594-4972UNSPECIFIED
Kokoszka, PiotrUNSPECIFIEDUNSPECIFIEDUNSPECIFIED
Steinebach, Josef G.UNSPECIFIEDUNSPECIFIEDUNSPECIFIED
URN: urn:nbn:de:hbz:38-447203
DOI: 10.1016/j.jmva.2013.11.009
Journal or Publication Title: J. Multivar. Anal.
Volume: 124
Page Range: S. 313 - 333
Date: 2014
Publisher: ELSEVIER INC
Place of Publication: SAN DIEGO
ISSN: 0047-259X
Language: English
Faculty: Unspecified
Divisions: Unspecified
Subjects: no entry
Uncontrolled Keywords:
KeywordsLanguage
TIME-SERIESMultiple languages
Statistics & ProbabilityMultiple languages
URI: http://kups.ub.uni-koeln.de/id/eprint/44720

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