This paper considers a linear triangular simultaneous equations model with condi-tional quantile restrictions. The paper adjusts for endogeneity by adopting a control function approach and presents a simple two-step estimator that exploits the partially linear structure of the model. The first step consists of estimation of the residuals of the reduced-form equation for the endogenous explanatory variable. The second step is series estimation of the primary equation with the reduced-form residual included non-parametrically as an additional explanatory variable. This paper imposes no functional form restrictions on the stochastic relationship between the reduced-form residual and the disturbance term in the primary equation conditional on o...
Abstract. In this paper, we develop a new censored quantile instrumental variable (CQIV) estimator a...
For fixed α Ε 0, 1., the quantile regression function gives the α th quantile θ αx. in the condition...
The main two methods of endogeneity correction for linear quantile regressions with their advantages...
This paper considers a linear triangular simultaneous equations model with condi-tional quantile res...
The first chapter proposes an alternative (`dual regression') to the quantile regression process for...
This paper provides a control function estimator to adjust for endogeneity in the triangular simulta...
This paper studies estimation and inference for linear quantile regression models with generated reg...
In this paper, we propose a variance reduction method for quantile regressions with endogeneity prob...
This paper uses control variables to identify and estimate models with nonseparable, multidimensiona...
International audienceIn this paper, we propose a new variance reduction method for quantile regress...
The ability of quantile regression models to characterize the heterogeneous impact of variables on d...
Abstract. In this paper, we develop a new censored quantile instrumental variable (CQIV) estimator a...
Abstract. In this paper, we develop a new censored quantile instrumental variable (CQIV) estimator a...
This paper is about identification and estimation in a triangular nonparametric structural model wit...
International audienceHeterogeneity in how some independent variables affect a dependent variable is...
Abstract. In this paper, we develop a new censored quantile instrumental variable (CQIV) estimator a...
For fixed α Ε 0, 1., the quantile regression function gives the α th quantile θ αx. in the condition...
The main two methods of endogeneity correction for linear quantile regressions with their advantages...
This paper considers a linear triangular simultaneous equations model with condi-tional quantile res...
The first chapter proposes an alternative (`dual regression') to the quantile regression process for...
This paper provides a control function estimator to adjust for endogeneity in the triangular simulta...
This paper studies estimation and inference for linear quantile regression models with generated reg...
In this paper, we propose a variance reduction method for quantile regressions with endogeneity prob...
This paper uses control variables to identify and estimate models with nonseparable, multidimensiona...
International audienceIn this paper, we propose a new variance reduction method for quantile regress...
The ability of quantile regression models to characterize the heterogeneous impact of variables on d...
Abstract. In this paper, we develop a new censored quantile instrumental variable (CQIV) estimator a...
Abstract. In this paper, we develop a new censored quantile instrumental variable (CQIV) estimator a...
This paper is about identification and estimation in a triangular nonparametric structural model wit...
International audienceHeterogeneity in how some independent variables affect a dependent variable is...
Abstract. In this paper, we develop a new censored quantile instrumental variable (CQIV) estimator a...
For fixed α Ε 0, 1., the quantile regression function gives the α th quantile θ αx. in the condition...
The main two methods of endogeneity correction for linear quantile regressions with their advantages...