In complicated/nonlinear parametric models, it is generally hard to know whether the model parameters are point identified. We provide computationally attractive procedures to construct confidence sets (CSs) for identified sets of full parameters and of subvectors in models defined through a likelihood or a vector of moment equalities or inequalities. These CSs are based on level sets of optimal sample criterion functions (such as likelihood or optimally-weighted or continuously-updated GMM criterions). The level sets are constructed using cutoffs that are computed via Monte Carlo (MC) simulations directly from the quasi-posterior distributions of the criterions. We establish new Bernstein-von Mises (or Bayesian Wilks) type theorems for the quas...
We provide methods for inference on a finite dimensional parameter of interest, θ in Re ^{ d _θ}, in ...
We study the problem of building confidence sets for ratios of parameters, from an identification ro...
In the setting of high-dimensional linear models with Gaussian noise, we investigate the possibility...
In complicated/nonlinear parametric models, it is generally hard to know whether the model parameter...
In complicated/nonlinear parametric models, it is generally hard to determine whether the model para...
A large sample approximation of the posterior distribution of partially identified structural parame...
Partially identified models commonly arise in enormous fields, including but not limited to economic...
This paper develops a Bayesian approach to inference in a class of partially identified econometric ...
In this paper, we first re-visit the inference problem for interval identified parameters originally...
Abstract. This paper provides confidence regions for minima of an econometric criterion function Q(9...
We analyze the identification and estimation of parameters β satisfying the incomplete linear moment...
Motivated by Manski and Tamer (2002) and especially their partial identification analysis of the re...
Abstract. This paper provides confidence regions for minima of an econometric criterion function Q{d...
Bayesian partially identified models have received a growing attention in recent years in the econom...
We propose inference procedures for partially identified population features for which the populatio...
We provide methods for inference on a finite dimensional parameter of interest, θ in Re ^{ d _θ}, in ...
We study the problem of building confidence sets for ratios of parameters, from an identification ro...
In the setting of high-dimensional linear models with Gaussian noise, we investigate the possibility...
In complicated/nonlinear parametric models, it is generally hard to know whether the model parameter...
In complicated/nonlinear parametric models, it is generally hard to determine whether the model para...
A large sample approximation of the posterior distribution of partially identified structural parame...
Partially identified models commonly arise in enormous fields, including but not limited to economic...
This paper develops a Bayesian approach to inference in a class of partially identified econometric ...
In this paper, we first re-visit the inference problem for interval identified parameters originally...
Abstract. This paper provides confidence regions for minima of an econometric criterion function Q(9...
We analyze the identification and estimation of parameters β satisfying the incomplete linear moment...
Motivated by Manski and Tamer (2002) and especially their partial identification analysis of the re...
Abstract. This paper provides confidence regions for minima of an econometric criterion function Q{d...
Bayesian partially identified models have received a growing attention in recent years in the econom...
We propose inference procedures for partially identified population features for which the populatio...
We provide methods for inference on a finite dimensional parameter of interest, θ in Re ^{ d _θ}, in ...
We study the problem of building confidence sets for ratios of parameters, from an identification ro...
In the setting of high-dimensional linear models with Gaussian noise, we investigate the possibility...