AbstractWe construct a simple algorithm, based on Newton's method, which permits asymptotic minimization of L1 distance for nonparametric density estimators. The technique is applicable to multivariate kernel estimators, multivariate histogram estimators, and smoothed histogram estimators such as frequency polygons. It has an “adaptive” or “data-driven” version. We show theoretically that both theoretical and adaptive forms of the algorithm do indeed minimize asymptotic L1 distance. Then we apply the algorithm to derive concise formulae for asymptotically optimal smoothing parameters. We also give numerical examples of applications of the adaptive algorithm
In this work, three extensions of univariate nonparametric probability density estimators into two d...
In this paper, we propose a new family of density estimates closely related to the nearest neighbor ...
We consider the problem of the nonparametric minimax estimation of a multivariate density at a given...
We construct a simple algorithm, based on Newton's method, which permits asymptotic minimization of ...
We consider the construction of multivariate histogram estimators for any density f seeking to minim...
We given an algorithm for determining the window-size which minimizes mean absolute distance in kern...
We introduce simple nonparametric density estimators that generalize the classical histogram and fre...
We present a data-adaptive multivariate histogram estimator of an unknown density f based on n indep...
This paper develops a nonparametric density estimator with parametric overtones. Suppose f(x, θ) is ...
Tech ReportThe nonparametric density estimation method proposed in this paper is computationally fas...
The non-parametric MLE for an isotonic density was first developed by Grenander [8], and the estimat...
Abstract. In this paper, we suggest to model priors on human motion by means of nonparametric kernel...
We consider estimation of multivariate densities with histograms which are based on data-dependent p...
Abstract. In [ 5] we have announced a h e a r spllne method for nonparametric density and distribut...
The present paper is concerned with the problem of estimating the convolution of densities. We propo...
In this work, three extensions of univariate nonparametric probability density estimators into two d...
In this paper, we propose a new family of density estimates closely related to the nearest neighbor ...
We consider the problem of the nonparametric minimax estimation of a multivariate density at a given...
We construct a simple algorithm, based on Newton's method, which permits asymptotic minimization of ...
We consider the construction of multivariate histogram estimators for any density f seeking to minim...
We given an algorithm for determining the window-size which minimizes mean absolute distance in kern...
We introduce simple nonparametric density estimators that generalize the classical histogram and fre...
We present a data-adaptive multivariate histogram estimator of an unknown density f based on n indep...
This paper develops a nonparametric density estimator with parametric overtones. Suppose f(x, θ) is ...
Tech ReportThe nonparametric density estimation method proposed in this paper is computationally fas...
The non-parametric MLE for an isotonic density was first developed by Grenander [8], and the estimat...
Abstract. In this paper, we suggest to model priors on human motion by means of nonparametric kernel...
We consider estimation of multivariate densities with histograms which are based on data-dependent p...
Abstract. In [ 5] we have announced a h e a r spllne method for nonparametric density and distribut...
The present paper is concerned with the problem of estimating the convolution of densities. We propo...
In this work, three extensions of univariate nonparametric probability density estimators into two d...
In this paper, we propose a new family of density estimates closely related to the nearest neighbor ...
We consider the problem of the nonparametric minimax estimation of a multivariate density at a given...