Open Access
April 1998 Nonlinear principal components I. Absolutely continuous random variables with positive bounded densities
Ernesto Salinelli
Ann. Statist. 26(2): 596-616 (April 1998). DOI: 10.1214/aos/1028144850

Abstract

Nonlinear principal components for an absolutely continuous random vector X with positive bounded density are defined as the solution of a variational problem in a suitable function space. In this way transformations depending on all the components of X are obtained. Some properties of nonlinear principal components are proved: in particular, it is shown that the set of nonlinear principal transformations of X is an orthonormal basis for the function space associated with the optimal problem. The spectral decomposition of X and its covariance matrix with respect to this basis are given. A notion of marginal nonlinear principal components is sketched and the relations with nonlinear principal components are shown. Finally, treating the case of random vectors distributed on unbounded domains, the existence problem is shown to be related to the global existence of the moment generating function of X. Since it is not restrictive, definitions and results are stated in terms of a uniformly distributed random vector.

Citation

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Ernesto Salinelli. "Nonlinear principal components I. Absolutely continuous random variables with positive bounded densities." Ann. Statist. 26 (2) 596 - 616, April 1998. https://doi.org/10.1214/aos/1028144850

Information

Published: April 1998
First available in Project Euclid: 31 July 2002

zbMATH: 0929.62067
MathSciNet: MR1626079
Digital Object Identifier: 10.1214/aos/1028144850

Subjects:
Primary: 62H25
Secondary: 35J20

Keywords: Laplacian , moment generating function , Nonlinear principal components , Sobolev Spaces

Rights: Copyright © 1998 Institute of Mathematical Statistics

Vol.26 • No. 2 • April 1998
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