In this paper we propose a new nonparametric kernel based estimator for a density function $f$ which achieves bias reduction relative to the classical Rosenblatt-Parzen estimator. Contrary to some existing estimators that provide for bias reduction, our estimator has a full asymptotic characterization including uniform consistency and asymptotic normality. In addition, we show that bias reduction can be achieved without the disadvantage of potential negativity of the estimated density - a deficiency that results from using higher order kernels. Our results are based on imposing global Lipschitz conditions on $f$ and defining a novel corresponding kernel. A Monte Carlo study is provided to illustrate the estimator's finite sample perf...
We consider semiparametric asymmetric kernel density estimators when the unknown density has support...
AbstractTwo methods are suggested for removing the problem of negativity of high-order kernel densit...
This article considers smooth density estimation based on length biased data that involves a random ...
In this paper we propose a new nonparametric kernel based estimator for a density function $f$ which...
Estimators for derivatives associated with a density function can be useful in identifying its modes...
Estimators for derivatives associated with a density function can be useful in identifying its modes...
The paper introduces the idea of inadmissible kernels and shows that an Epanechnikov type kernel is ...
In this article, we propose a new method of bias reduction in nonparametric regression estimation. T...
In this article, we propose a new method of bias reduction in nonparametric regression estimation. T...
For order $q$ kernel density estimators we show that the constant $b_q$ in $bias=b_qh^q+o(h^q)$ can ...
A new method for bias reduction in nonparametric density estimation is proposed. The method is a sim...
AbstractThe problem of nonparametric estimation of a multivariate density function is addressed. In ...
Kernel density estimates are frequently used, based on a second order kernel. Thus, the bias inheren...
For order $q$ kernel density estimators we show that the constant $b_q$ in $bias=b_qh^q+o(h^q)$ can ...
New nonparametric procedure for estimating the probability density function of a positive random var...
We consider semiparametric asymmetric kernel density estimators when the unknown density has support...
AbstractTwo methods are suggested for removing the problem of negativity of high-order kernel densit...
This article considers smooth density estimation based on length biased data that involves a random ...
In this paper we propose a new nonparametric kernel based estimator for a density function $f$ which...
Estimators for derivatives associated with a density function can be useful in identifying its modes...
Estimators for derivatives associated with a density function can be useful in identifying its modes...
The paper introduces the idea of inadmissible kernels and shows that an Epanechnikov type kernel is ...
In this article, we propose a new method of bias reduction in nonparametric regression estimation. T...
In this article, we propose a new method of bias reduction in nonparametric regression estimation. T...
For order $q$ kernel density estimators we show that the constant $b_q$ in $bias=b_qh^q+o(h^q)$ can ...
A new method for bias reduction in nonparametric density estimation is proposed. The method is a sim...
AbstractThe problem of nonparametric estimation of a multivariate density function is addressed. In ...
Kernel density estimates are frequently used, based on a second order kernel. Thus, the bias inheren...
For order $q$ kernel density estimators we show that the constant $b_q$ in $bias=b_qh^q+o(h^q)$ can ...
New nonparametric procedure for estimating the probability density function of a positive random var...
We consider semiparametric asymmetric kernel density estimators when the unknown density has support...
AbstractTwo methods are suggested for removing the problem of negativity of high-order kernel densit...
This article considers smooth density estimation based on length biased data that involves a random ...