We consider tests of a simple null hypothesis on a subset of the coefficients of the exogenous and endogenous regressors in a single-equation linear instrumental variables regression model with potentially weak identification. Existing methods of subset inference (i) rely on the assumption that the parameters not under test are strongly identified, or (ii) are based on projection-type arguments. We show that, under homoskedasticity, the subset Anderson and Rubin (1949) test that replaces unknown parameters by limited information maximum likelihood estimates has correct asymptotic size without imposing additional identification assumptions, but that the corresponding subset Lagrange multiplier test is size distorted asymptotically
We introduce a new test for a two-sided hypothesis involving a subset of the structural parameter ve...
We introduce a new test for a two-sided hypothesis involving a subset of the struc tural parameter v...
This paper explores the sensitivity of plug-in based subset tests to instrument exclusion in linear ...
My doctoral dissertation aims to study several issues on identification and weak identification, wit...
On the asymptotic sizes of subset Anderson-Rubin and Lagrange multiplier tests in linear instrumenta...
We focus on the linear instrumental variable model with two endogenous regressors under conditional ...
We show that Moreira’s (2003) conditional critical value function for likelihood ratio (LR) tests on...
We show that the limiting distributions of subset extensions of the weak instrument robust instrumen...
We show that the (conditional) limiting distributions of the subset extensions of the weak instrumen...
This paper investigates the asymptotic size properties of robust subset tests when instruments are l...
We consider inference in the linear regression model with one endogenous variable and potentially we...
We study subvector inference in the linear instrumental variables model assuming homoskedasticity bu...
We study subvector inference in the linear instrumental variables model assuming homoskedasticity bu...
We consider hypothesis testing in instrumental variable regression models with few included exogenou...
We develop Lagrange multiplier and likelihood ratio statistics to test hypotheses on subsets of the ...
We introduce a new test for a two-sided hypothesis involving a subset of the structural parameter ve...
We introduce a new test for a two-sided hypothesis involving a subset of the struc tural parameter v...
This paper explores the sensitivity of plug-in based subset tests to instrument exclusion in linear ...
My doctoral dissertation aims to study several issues on identification and weak identification, wit...
On the asymptotic sizes of subset Anderson-Rubin and Lagrange multiplier tests in linear instrumenta...
We focus on the linear instrumental variable model with two endogenous regressors under conditional ...
We show that Moreira’s (2003) conditional critical value function for likelihood ratio (LR) tests on...
We show that the limiting distributions of subset extensions of the weak instrument robust instrumen...
We show that the (conditional) limiting distributions of the subset extensions of the weak instrumen...
This paper investigates the asymptotic size properties of robust subset tests when instruments are l...
We consider inference in the linear regression model with one endogenous variable and potentially we...
We study subvector inference in the linear instrumental variables model assuming homoskedasticity bu...
We study subvector inference in the linear instrumental variables model assuming homoskedasticity bu...
We consider hypothesis testing in instrumental variable regression models with few included exogenou...
We develop Lagrange multiplier and likelihood ratio statistics to test hypotheses on subsets of the ...
We introduce a new test for a two-sided hypothesis involving a subset of the structural parameter ve...
We introduce a new test for a two-sided hypothesis involving a subset of the struc tural parameter v...
This paper explores the sensitivity of plug-in based subset tests to instrument exclusion in linear ...