In this paper, we develop robust inference procedures for an instrumental variables model defined by Y = D′α(U) where D′α(U) is strictly increasing in U and U is a uniform variable that may depend onD but is independent of a set of instrumental variables Z. The proposed inferential procedures are computationally convenient in typical applications and can be carried out using software available for ordinary quantile regression. Our inferential procedure arises naturally from an estimation algorithm and has the important feature of being robust to weak and partial identification and remains valid even in cases where identification fails completely. The use of the proposed procedures is illustrated through two empirical examples
A new, broad family of quantile-based estimators is described, and theoretical and empirical evidenc...
We give methods for the construction of designs for regression models, when the purpose of the inves...
We propose an instrumental variable quantile regression (IVQR) estimator for spatial autoregres-sive...
This paper establishes that the availability of instrumental variables enables the identification an...
Extending the L1-IV approach proposed by Sakata (1997, 2007), we develop a new method, named the $rh...
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...
This thesis provides estimation and testing procedures in nonparametric instrumental mean and quanti...
In this paper, we develop a new censored quantile instrumental variable (CQIV) estimator and describ...
The instrumental variable quantile regression (IVQR) model (Chernozhukov and Hansen (2005)) is a pop...
Abstract. In this paper, we develop a new censored quantile instrumental variable (CQIV) estimator a...
This chapter reviews instrumental variable models of quantile treatment effects. We focus on models ...
This paper is concerned with inference about a function g that is identified by a conditional quanti...
Abstract. In this paper, we develop a new censored quantile instrumental variable (CQIV) estimator a...
There are many environments in econometrics which require nonseparable modeling of a structural dist...
A new, broad family of quantile-based estimators is described, and theoretical and empirical evidenc...
We give methods for the construction of designs for regression models, when the purpose of the inves...
We propose an instrumental variable quantile regression (IVQR) estimator for spatial autoregres-sive...
This paper establishes that the availability of instrumental variables enables the identification an...
Extending the L1-IV approach proposed by Sakata (1997, 2007), we develop a new method, named the $rh...
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...
This thesis provides estimation and testing procedures in nonparametric instrumental mean and quanti...
In this paper, we develop a new censored quantile instrumental variable (CQIV) estimator and describ...
The instrumental variable quantile regression (IVQR) model (Chernozhukov and Hansen (2005)) is a pop...
Abstract. In this paper, we develop a new censored quantile instrumental variable (CQIV) estimator a...
This chapter reviews instrumental variable models of quantile treatment effects. We focus on models ...
This paper is concerned with inference about a function g that is identified by a conditional quanti...
Abstract. In this paper, we develop a new censored quantile instrumental variable (CQIV) estimator a...
There are many environments in econometrics which require nonseparable modeling of a structural dist...
A new, broad family of quantile-based estimators is described, and theoretical and empirical evidenc...
We give methods for the construction of designs for regression models, when the purpose of the inves...
We propose an instrumental variable quantile regression (IVQR) estimator for spatial autoregres-sive...