The asymptotic behavior of nonparametric estimators of the probability density function of an i.i.d. sample and of the spectral density function of a stationary time series have been studied in some detail in the last 50-60 years. Nevertheless, an open problem remains to date, namely the behavior of the estimator when the target function happens to vanish at the point of interest. In the paper at hand we fill this gap, and show that asymptotic normality still holds true but with a super-efficient rate of convergence. We also provide two possible applications where these new results can be found useful in practice
AbstractThis paper studies the asymptotic properties of the kernel probability density estimate of s...
Let $ f_n(x) $ be a recursive kernel estimator of a probability density function $ f $ at a point $ ...
Let be a nonparametric estimate of a two-dimensional density f(x,y) constructed with the help of two...
The asymptotic behavior of nonparametric estimators of the probability density function of an i.i.d....
We propose a new asymptotic approximation for the sampling behaviour of nonparametric estimators of ...
Rate of convergence to normality for the density estimators of Kernel type is obtained when the obse...
Rate of convergence to normality for the density estimators of Kernel type is obtained when the obse...
Abstract. In [ 5] we have announced a h e a r spllne method for nonparametric density and distribut...
Nonparametric kernel estimation of density and conditional mean is widely used, but many of the poin...
In most treatments of nonparametric regression, it is assumed that the marginal density of the expla...
In this paper, the central limit theorems for the density estimator and for the integrated square er...
International audienceLet X m CXt,t>0] be a stationary stochastic process and suppose XQ has a proba...
Penalized likelihood method is among the most effective tools for nonparametric multivariate functio...
Nonparametric kernel estimation of density is widely used, how-ever, many of the pointwise and globa...
AbstractWeakly and strongly consistent nonparametric estimates, along with rates of convergence, are...
AbstractThis paper studies the asymptotic properties of the kernel probability density estimate of s...
Let $ f_n(x) $ be a recursive kernel estimator of a probability density function $ f $ at a point $ ...
Let be a nonparametric estimate of a two-dimensional density f(x,y) constructed with the help of two...
The asymptotic behavior of nonparametric estimators of the probability density function of an i.i.d....
We propose a new asymptotic approximation for the sampling behaviour of nonparametric estimators of ...
Rate of convergence to normality for the density estimators of Kernel type is obtained when the obse...
Rate of convergence to normality for the density estimators of Kernel type is obtained when the obse...
Abstract. In [ 5] we have announced a h e a r spllne method for nonparametric density and distribut...
Nonparametric kernel estimation of density and conditional mean is widely used, but many of the poin...
In most treatments of nonparametric regression, it is assumed that the marginal density of the expla...
In this paper, the central limit theorems for the density estimator and for the integrated square er...
International audienceLet X m CXt,t>0] be a stationary stochastic process and suppose XQ has a proba...
Penalized likelihood method is among the most effective tools for nonparametric multivariate functio...
Nonparametric kernel estimation of density is widely used, how-ever, many of the pointwise and globa...
AbstractWeakly and strongly consistent nonparametric estimates, along with rates of convergence, are...
AbstractThis paper studies the asymptotic properties of the kernel probability density estimate of s...
Let $ f_n(x) $ be a recursive kernel estimator of a probability density function $ f $ at a point $ ...
Let be a nonparametric estimate of a two-dimensional density f(x,y) constructed with the help of two...