Perturbations of Operators with Application to Testing Equality of Covariance Operators.

dc.contributor.committeeMemberRuymgaart, Frits
dc.contributor.committeeMemberAllen, Linda J. S.
dc.contributor.committeeMemberHadjicostas, Petros
dc.creatorKaphle, Krishna
dc.date.accessioned2016-11-14T23:11:47Z
dc.date.available2011-07-06T17:10:02Z
dc.date.available2016-11-14T23:11:47Z
dc.date.issued2011-07
dc.degree.departmentMathematics and Statisticsen_US
dc.description.abstractThe generalization of multivariate statistical procedures to infinite dimension naturally requires extra theoretical work. In this dissertation, we will focus on testing the equality of covariance operators. We derive a procedure from the Union Intersection principle in conjunction with a Likelihood Ratio test. This procedure leads to a statistic which is the largest eigenvalue of a product of operators. We generalize this procedure by using a test statistic that is based on the first $m \in \mathbb{N}$ largest eigenvalues. Perturbation theory of operators and functional calculus of covariance operators are extensively used to derieve the required asymptotics. It is shown that the power of the test is improved with inclusion of more eigenvalues. We perform simulations to corroborate the testing procedure, using samples from two Gaussian distributions.
dc.format.mimetypeapplication/pdf
dc.identifier.urihttp://hdl.handle.net/2346/ETD-TTU-2011-08-1601en_US
dc.language.isoeng
dc.rights.availabilityUnrestricted.
dc.subjectCovariance operatorsen_US
dc.subjectFunctional data
dc.subjectDelta method
dc.titlePerturbations of Operators with Application to Testing Equality of Covariance Operators.
dc.typeDissertation

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