Add to ORKGAn efficient sieve maximum likelihood estimation procedure for regression models with endogenous regressors using a copula-based approach is proposed. Specifically, the joint distribution of the endogenous regressor and the error term is characterized by a parametric copula function evaluated at the nonparametric marginal distributions. The asymptotic properties of the proposed estimator are derived, including semiparametrically efficient property. Monte Carlo simulations reveal that the proposed method performs well in finite samples comparing to other existing methods. An empirical application is presented to demonstrate the usefulness of the proposed approach
This paper considers a linear regression model with an endogenous regressor which is not normally di...
This papers considers an alternative estimation procedures for estimating stochastic frontier models...
We propose, for multivariate Gaussian copula models with unknown margins and structured correlation ...
Recent literature on semiparametric copula models focused on the situation when the marginals are sp...
Recent literature on semiparametric copula models focused on the situation when the marginals are sp...
We investigate a new approach to estimating a regression function based on copulas. The main idea be...
This paper considers efficient estimation of copula-based semiparametric strictly stationary Markov ...
This paper studies the estimation of copula-based semi parametric stationary Markov models. Describe...
This article proposes a panel data generalization for a recently suggested instrumental variable-fre...
This article proposes a panel data generalization for a recently suggested instrumental variable-fre...
This thesis addresses aspects of the statistical inference problem for the semiparametric elliptical...
AbstractConsider the model Y=m(X)+ε, where m(⋅)=med(Y|⋅) is unknown but smooth. It is often assumed ...
This papers considers an alternative estimation procedures for estimating stochastic frontier models...
Consider the model Y = m(X)+ ε, where m(·) = med(Y |·) is unknown but smooth. It is often assumed t...
Quantitative studies in many fields involve the analysis of multivariate data of diverse types, incl...
This paper considers a linear regression model with an endogenous regressor which is not normally di...
This papers considers an alternative estimation procedures for estimating stochastic frontier models...
We propose, for multivariate Gaussian copula models with unknown margins and structured correlation ...
Recent literature on semiparametric copula models focused on the situation when the marginals are sp...
Recent literature on semiparametric copula models focused on the situation when the marginals are sp...
We investigate a new approach to estimating a regression function based on copulas. The main idea be...
This paper considers efficient estimation of copula-based semiparametric strictly stationary Markov ...
This paper studies the estimation of copula-based semi parametric stationary Markov models. Describe...
This article proposes a panel data generalization for a recently suggested instrumental variable-fre...
This article proposes a panel data generalization for a recently suggested instrumental variable-fre...
This thesis addresses aspects of the statistical inference problem for the semiparametric elliptical...
AbstractConsider the model Y=m(X)+ε, where m(⋅)=med(Y|⋅) is unknown but smooth. It is often assumed ...
This papers considers an alternative estimation procedures for estimating stochastic frontier models...
Consider the model Y = m(X)+ ε, where m(·) = med(Y |·) is unknown but smooth. It is often assumed t...
Quantitative studies in many fields involve the analysis of multivariate data of diverse types, incl...
This paper considers a linear regression model with an endogenous regressor which is not normally di...
This papers considers an alternative estimation procedures for estimating stochastic frontier models...
We propose, for multivariate Gaussian copula models with unknown margins and structured correlation ...