Add to ORKGIn this paper, we consider the non-parametric, kernel estimate of the density, f(x), for data drawn from stratified samples. Much of the data used by social scientists is gathered in some type of complex survey violating the usual assumptions of independently and identically distributed data. Such e¤ects induced by the survey structure are rarely considered in the literature on non-parametric density estimation, yet they may have serious consequences for our analysis, as shown in this paper. A weighted estimator is developed which provides asymptotically unbiased density estimation for stratified samples. A data-based method for choosing the optimal bandwidth is suggested, using information on within-stratum variances and means. The weight...
This paper develops a nonparametric density estimator with parametric overtones. Suppose f(x, θ) is ...
Nonparametric density estimation is of great importance when econometricians want to model the prob...
Includes bibliographical references (p. 34-35).James L. Powell, Thomas M. Stoker
In this paper, we consider the non-parametric, kernel estimate of the density, f(x), for data drawn ...
In this paper, we consider the non-parametric, kernel estimate of the density, f(x), for data drawn ...
We consider a weighted, nonparametric density estimator for stratified samples. We derive the optima...
Kernel density estimation is probably the most widely used non parametric statistical method for est...
A method is proposed for semiparametric estimation where parametric and nonparametric criteria are e...
We present a kernel estimator for the density of a variable when sampling probabilities depend on th...
We study nonparametric estimation of an unknown density function f based on the ranked-based observa...
We consider the problem of multivariate density estimation, using samples from the distribution of i...
In contrast to the traditional kernel density estimate which is totally nonparametric, if one has a ...
In contrast to the traditional kernel density estimate which is totally nonparametric, if one has a ...
We show that maximum likelihood weighted kernel density estimation offers a unified approach to dens...
Some authors have recently warned about the risks of the sentence with enough data, the numbers spea...
This paper develops a nonparametric density estimator with parametric overtones. Suppose f(x, θ) is ...
Nonparametric density estimation is of great importance when econometricians want to model the prob...
Includes bibliographical references (p. 34-35).James L. Powell, Thomas M. Stoker
In this paper, we consider the non-parametric, kernel estimate of the density, f(x), for data drawn ...
In this paper, we consider the non-parametric, kernel estimate of the density, f(x), for data drawn ...
We consider a weighted, nonparametric density estimator for stratified samples. We derive the optima...
Kernel density estimation is probably the most widely used non parametric statistical method for est...
A method is proposed for semiparametric estimation where parametric and nonparametric criteria are e...
We present a kernel estimator for the density of a variable when sampling probabilities depend on th...
We study nonparametric estimation of an unknown density function f based on the ranked-based observa...
We consider the problem of multivariate density estimation, using samples from the distribution of i...
In contrast to the traditional kernel density estimate which is totally nonparametric, if one has a ...
In contrast to the traditional kernel density estimate which is totally nonparametric, if one has a ...
We show that maximum likelihood weighted kernel density estimation offers a unified approach to dens...
Some authors have recently warned about the risks of the sentence with enough data, the numbers spea...
This paper develops a nonparametric density estimator with parametric overtones. Suppose f(x, θ) is ...
Nonparametric density estimation is of great importance when econometricians want to model the prob...
Includes bibliographical references (p. 34-35).James L. Powell, Thomas M. Stoker