 Estimating the mean function of a Gaussian process and the Stein effectJames Berger and Robert Wolpert Journal of Multivariate Analysis, 1983, vol. 13, issue 3, 401-424 Abstract: The problem of global estimation of the mean function [theta](·) of a quite arbitrary Gaussian process is considered. The loss function in estimating [theta] by a function a(·) is assumed to be of the form L([theta], a) = [integral operator] [[theta](t) - a(t)]2[mu](dt), and estimators are evaluated in terms of their risk function (expected loss). The usual minimax estimator of [theta] is shown to be inadmissible via the Stein phenomenon; in estimating the function [theta] we are trying to simultaneously estimate a larger number of normal means. Estimators improving upon the usual minimax estimator are constructed, including an estimator which allows the incorporation of prior information about [theta]. The analysis is carried out by using a version of the Karhunen-Loéve expansion to represent the original problem as the problem of estimating a countably infinite sequence of means from independent normal distributions. Keywords: Estimation; mean; function; Gaussian; process; Stein; effect; integrated; quadratic; loss; risk; function; minimax; Karhunen-Loeve; expansion; incorporation; of; prior; information (search for similar items in EconPapers) Downloads: (external link) Related works: Export reference: BibTeX RIS (EndNote, ProCite, RefMan) HTML/Text Persistent link: https://EconPapers.repec.org/RePEc:eee:jmvana:v:13:y:1983:i:3:p:401-424 Ordering information: This journal article can be ordered from Access Statistics for this article Journal of Multivariate Analysis is currently edited by de Leeuw, J. More articles in Journal of Multivariate Analysis from Elsevier |
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