Title of article
Bivariate Density Estimation with Randomly Truncated Data
Author/Authors
Gürler، نويسنده , , ـlkü and Prewitt، نويسنده , , Kathryn، نويسنده ,
Issue Information
دوفصلنامه با شماره پیاپی سال 2000
Pages
28
From page
88
To page
115
Abstract
In this study bivariate kernel density estimators are considered when a component is subject to random truncation. In bivariate truncation models one observes the i.i.d. samples from the triplets (T, Y, X) only if T⩽Y. In this set-up, Y is said to be left truncated by T and T is right truncated by Y. We consider the estimation of the bivariate density function of (Y, X) via nonparametric kernel methods where Y is the variable of interest and X a covariate. We establish an i.i.d. representation of the bivariate distribution function estimator and show that the remainder term achieves an improved order of O(n−1 ln n), which is desirable for density estimation purposes. Expressions are then provided for the bias and the variance of the estimators. Finally some simulation results are presented.
Keywords
truncation/censoring , kernel density estimators , Bivariate distribution
Journal title
Journal of Multivariate Analysis
Serial Year
2000
Journal title
Journal of Multivariate Analysis
Record number
1557653
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