In this paper we consider the estimation of the error distribution in a heteroscedastic nonparametric regression model with multivariate covariates. As estimator we consider the empirical distribution function of residuals, which are obtained from multivariate local polynomial fits of the regression and variance functions, respectively. Weak convergence of the empirical residual process to a Gaussian process is proved. We also consider various applications for testing model assumptions in nonparametric multiple regression. The model tests obtained are able to detect local alternatives that converge to zero at an n(-12)-rate, independent of the covariate dimension. We consider in detail a test for additivity of the regression function. (C) 2...
International audienceIn this work, we consider a multivariate regression model with one-sided error...
In this paper several testing procedures are proposed that can detect change-points in the error dis...
In this paper, a partially linear multivariate model with error in the explanatory variable of the n...
In this paper we consider the estimation of the error distribution in a heteroscedastic nonparametri...
AbstractIn this paper we consider the estimation of the error distribution in a heteroscedastic nonp...
Abstract. We consider nonparametric regression models with multivariate covariates and estimate the ...
We consider a nonparametric regression model with one-sided errors and regression function in a gene...
The aim of this paper is to show that existing estimators for the error distribution in nonparametri...
Empirical characteristic function, Kernel regression estimator, Goodness-of-fit, Parametric bootstra...
For the problem of testing symmetry of the error distribution in a nonparametric re-gression model w...
This paper addresses the problem of fitting a known distribution to the innovation distribution in a...
Heteroskedastic errors can lead to inaccurate statistical conclusions if they are not properly hand...
Consider a heteroscedastic regression model Y=m(X) +σ(X)ε, where the functions m and σ are “smooth”,...
Consider a heteroscedastic regression model Y = m(X) + σ(X)ε, where m(X) = E(Y|X) and σ2 (X) = Var(Y...
The effect of errors in variables in nonparametric regression estimation is examined. To account for...
International audienceIn this work, we consider a multivariate regression model with one-sided error...
In this paper several testing procedures are proposed that can detect change-points in the error dis...
In this paper, a partially linear multivariate model with error in the explanatory variable of the n...
In this paper we consider the estimation of the error distribution in a heteroscedastic nonparametri...
AbstractIn this paper we consider the estimation of the error distribution in a heteroscedastic nonp...
Abstract. We consider nonparametric regression models with multivariate covariates and estimate the ...
We consider a nonparametric regression model with one-sided errors and regression function in a gene...
The aim of this paper is to show that existing estimators for the error distribution in nonparametri...
Empirical characteristic function, Kernel regression estimator, Goodness-of-fit, Parametric bootstra...
For the problem of testing symmetry of the error distribution in a nonparametric re-gression model w...
This paper addresses the problem of fitting a known distribution to the innovation distribution in a...
Heteroskedastic errors can lead to inaccurate statistical conclusions if they are not properly hand...
Consider a heteroscedastic regression model Y=m(X) +σ(X)ε, where the functions m and σ are “smooth”,...
Consider a heteroscedastic regression model Y = m(X) + σ(X)ε, where m(X) = E(Y|X) and σ2 (X) = Var(Y...
The effect of errors in variables in nonparametric regression estimation is examined. To account for...
International audienceIn this work, we consider a multivariate regression model with one-sided error...
In this paper several testing procedures are proposed that can detect change-points in the error dis...
In this paper, a partially linear multivariate model with error in the explanatory variable of the n...