We consider nonparametric estimation of a regression function that is identified by requiring a specified quantile of the regression “error ” conditional on an instrumental variable to be zero. The resulting estimating equation is a nonlinear integral equation of the first kind, which generates an ill-posed-inverse problem. The integral operator and distribution of the instrumental variable are unknown and must be estimated nonparametrically. We show that the estimator is mean-square consistent, derive its rate of convergence in probability, and give conditions under which this rate is optimal in a minimax sense. The results of Monte Carlo experiments show that the estimator behaves well in finite samples
We consider the nonparametric regression model with an additive error that is correlated with the ex...
The nonparametric estimation of a regression function x from conditional moment restrictions involvi...
The focus of the paper is the nonparametric estimation of an instrumental regression function ϕ defi...
We consider nonparametric estimation of a regression function that is identified by requiring a spec...
We consider nonparametric estimation of a regression function that is identified by requiring a spec...
Abstract: This paper discusses the solution of nonlinear integral equations with noisy integral kern...
International audienceThe focus of this paper is the nonparametric estimation of an instrumental reg...
This paper discusses the solution of nonlinear integral equations with noisy integral kernels as the...
The ill-posedness of the inverse problem of recovering a regression function in a nonparametric inst...
We suggest two nonparametric approaches, based on kernel methods and orthogonal series to estimatin...
We consider the nonparametric regression model with an additive error that is correlated with the ex...
This paper studies the estimation of a nonparametric function \varphi from the inverse problem r = T...
Inverse problems can be described as functional equations where the value of the function is known o...
We consider the general issue of estimating a nonparametric function x from the inverse problem r = ...
The focus of the paper is the nonparametric estimation of an instrumental regression function ϕ defi...
We consider the nonparametric regression model with an additive error that is correlated with the ex...
The nonparametric estimation of a regression function x from conditional moment restrictions involvi...
The focus of the paper is the nonparametric estimation of an instrumental regression function ϕ defi...
We consider nonparametric estimation of a regression function that is identified by requiring a spec...
We consider nonparametric estimation of a regression function that is identified by requiring a spec...
Abstract: This paper discusses the solution of nonlinear integral equations with noisy integral kern...
International audienceThe focus of this paper is the nonparametric estimation of an instrumental reg...
This paper discusses the solution of nonlinear integral equations with noisy integral kernels as the...
The ill-posedness of the inverse problem of recovering a regression function in a nonparametric inst...
We suggest two nonparametric approaches, based on kernel methods and orthogonal series to estimatin...
We consider the nonparametric regression model with an additive error that is correlated with the ex...
This paper studies the estimation of a nonparametric function \varphi from the inverse problem r = T...
Inverse problems can be described as functional equations where the value of the function is known o...
We consider the general issue of estimating a nonparametric function x from the inverse problem r = ...
The focus of the paper is the nonparametric estimation of an instrumental regression function ϕ defi...
We consider the nonparametric regression model with an additive error that is correlated with the ex...
The nonparametric estimation of a regression function x from conditional moment restrictions involvi...
The focus of the paper is the nonparametric estimation of an instrumental regression function ϕ defi...