Bernstein estimators are well-known to avoid the boundary bias problem of traditional kernel estimators. The theoretical properties of these estimators have been studied extensively on compact intervals and hypercubes, but never on the simplex, except for the mean squared error of the density estimator in Tenbusch (1994) when $d = 2$. The simplex is an important case as it is the natural domain of compositional data. In this paper, we make an effort to prove several asymptotic results (bias, variance, mean squared error (MSE), mean integrated squared error (MISE), asymptotic normality, uniform strong consistency) for Bernstein estimators of cumulative distribution functions and density functions on the $d$-dimensional simplex. Our results g...
In Mombeni et al. (2019), Birnbaum-Saunders and Weibull kernel estimators were introduced for the es...
In this note, we consider the problem of aggregation of estimators in order to denoise a signal. The...
The Bernstein operator is one of the important topics of approximation theory in which it has been s...
This paper deals with the approximation of functions by the classical Bernstein polynomials in terms...
We study the asymptotic properties of the Bernstein estimator for unbounded density copula function...
Ce mémoire porte sur la présentation des estimateurs de Bernstein qui sont des alternatives récentes...
International audienceDespite its slow convergence, the use of the Bernstein polynomial approximatio...
International audienceWe describe a method for distribution function and density estimation with Ber...
AbstractWhen learning processes depend on samples but not on the order of the information in the sam...
In this paper, we prove a local limit theorem for the ratio of the Poisson distribution to the Gauss...
International audienceWe propose a density approximation method based on Bernstein polynomials, cons...
We initiate the study of the Bernstein-Markov type inequalities for the so called asymmetric weights...
Copulas are extensively used for dependence modeling. In many cases the data does not reveal how th...
In this paper, we introduce a new smooth estimator for continuous distribution functions on the posi...
This paper considers multivariate extension of smooth estimator of the distribution and density func...
In Mombeni et al. (2019), Birnbaum-Saunders and Weibull kernel estimators were introduced for the es...
In this note, we consider the problem of aggregation of estimators in order to denoise a signal. The...
The Bernstein operator is one of the important topics of approximation theory in which it has been s...
This paper deals with the approximation of functions by the classical Bernstein polynomials in terms...
We study the asymptotic properties of the Bernstein estimator for unbounded density copula function...
Ce mémoire porte sur la présentation des estimateurs de Bernstein qui sont des alternatives récentes...
International audienceDespite its slow convergence, the use of the Bernstein polynomial approximatio...
International audienceWe describe a method for distribution function and density estimation with Ber...
AbstractWhen learning processes depend on samples but not on the order of the information in the sam...
In this paper, we prove a local limit theorem for the ratio of the Poisson distribution to the Gauss...
International audienceWe propose a density approximation method based on Bernstein polynomials, cons...
We initiate the study of the Bernstein-Markov type inequalities for the so called asymmetric weights...
Copulas are extensively used for dependence modeling. In many cases the data does not reveal how th...
In this paper, we introduce a new smooth estimator for continuous distribution functions on the posi...
This paper considers multivariate extension of smooth estimator of the distribution and density func...
In Mombeni et al. (2019), Birnbaum-Saunders and Weibull kernel estimators were introduced for the es...
In this note, we consider the problem of aggregation of estimators in order to denoise a signal. The...
The Bernstein operator is one of the important topics of approximation theory in which it has been s...