Optimal Wavelet Estimation of Density Derivatives for Size-Biased Data

A perfect achievement has been made for wavelet density estimation by Dohono et al. in 1996, when the samples without any noise are independent and identically distributed (i.i.d.). But in many practical applications, the random samples always have noises, and estimation of the density derivatives i...

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Bibliographic Details
Main Authors: Jinru Wang, Zijuan Geng, Fengfeng Jin
Format: Article
Language:English
Published: Hindawi Limited 2014-01-01
Series:Abstract and Applied Analysis
Online Access:http://dx.doi.org/10.1155/2014/512634
Description
Summary:A perfect achievement has been made for wavelet density estimation by Dohono et al. in 1996, when the samples without any noise are independent and identically distributed (i.i.d.). But in many practical applications, the random samples always have noises, and estimation of the density derivatives is very important for detecting possible bumps in the associated density. Motivated by Dohono's work, we propose new linear and nonlinear wavelet estimators f^lin(m),f^non(m) for density derivatives f(m) when the random samples have size-bias. It turns out that the linear estimation E(∥f^lin(m)-f(m)∥p) for f(m)∈Br,qs(A,L) attains the optimal covergence rate when r≥p, and the nonlinear one E(∥f^lin(m)-f(m)∥p) does the same if r<p.
ISSN:1085-3375
1687-0409