Convergence rates for trigonometric and polynomial-trigonometric regression estimators /

Bibliographic Details
Main Authors:	Eubank, Randall L., 1952- (Author), Speckman, Paul L. (Paul Lorenz), 1946- (Author)
Corporate Author:	National Science Foundation (U.S.) (sponsoring body.)
Format:	Book
Language:	English
Published:	College Station, Texas : Department of Statistics, Texas A & M University, [1989]
Series:	Technical report (Texas A & M University. Department of Statistics) ; no. 71.
Subjects:	Fourier series. Regression analysis. Estimation theory. Trigonometrical functions. Polynomials. Convergence. Smoothing (Statistics) Curve fitting. Nonparametric statistics. Mathematical statistics. Statistics > Nonparametric inference > Estimation. Statistics > Parametric inference > Asymptotic properties of estimators. Statistics > Nonparametric inference > Nonparametric regression. Trigonometric regression Polynomial regression

Description
Abstract:	Upper bounds are derived for the rates of convergence for trigonometric series regression estimators of an unknown, smooth regression function. The resulting rates depend on the regression function satisfying certain periodic boundary conditions that may not hold in practice. To overcome such difficulties alternative estimators are proposed which are obtained by regression on trigonometric functions and low-order polynomials. These estimators are shown to always be capable of obtaining the optimal rates of convergence over a particular smoothness class of functions, irregardless of whether or not the regression function is periodic.
Item Description:	Funding information taken from leaf 8.
Physical Description:	9 leaves ; 28 cm
Bibliography:	Includes bibliographical references (leaf 9).