Download This PaperRobust Estimation and Inference for Threshold Models with Integrated Regressors
45 Pages Posted: 1 Jul 2013
Date Written: June 30, 2013
Abstract
This paper studies the robust estimation and inference of threshold models with integrated regressors. We derive the asymptotic distribution of the profiled least squares (LS) estimator under the diminishing threshold effect assumption that the size of the threshold effect converges to zero. Depending on how rapidly this sequence converges, the model may be identified or only weakly identified and asymptotic theorems are developed for both cases. As the convergence rate is unknown in practice, a model-selection procedure is applied to determine the model identification strength and to construct robust confidence intervals, which have the correct asymptotic size irrespective of the magnitude of the threshold effect. The model is then generalized to incorporate endogeneity and serial correlation in error terms, under which, we design a Cochrane-Orcutt feasible generalized least squares (FGLS) estimator which enjoys efficiency gains and robustness against different error specifications, including both I(0) and I(1) errors. Based on this FGLS estimator, we further develop a sup-Wald statistic to test for the existence of the threshold effect. Monte Carlo simulations show that our estimators and test statistics perform well.
Keywords: Threshold effects, Integrated processes, Nonlinear cointegration, Weak identification
JEL Classification: C12, C22, C52
Suggested Citation: Suggested Citation
Do you have a job opening that you would like to promote on SSRN?
Recommended Papers
-
Asymptotic Theory for Local Time Density Estimation and Nonparametric Cointegration Regression
By Qiying Wang and Peter C. B. Phillips
-
Structural Nonparametric Cointegrating Regression
By Qiying Wang and Peter C. B. Phillips
-
Limit Theorems for Functionals of Sums that Converge to Fractional Stable Motions
-
Design-Adaptive Pointwise Non-Parametric Regression Estimation for Recurrent Markov Time Series
-
Asymptotic Theory for Zero Energy Density Estimation with Nonparametric Regression Applications
By Qiying Wang and Peter C. B. Phillips
-
Limit Theorems for Functionals of Sums that Converge to Fractional Brownian and Stable Motions
-
Nonparametric Structural Estimation Via Continuous Location Shifts in an Endogenous Regressor
By Peter C. B. Phillips and Liangjun Su
-
Orthogonal Expansion of Levy Process Functionals: Theory and Practice
By Chaohua Dong and Jiti Gao
-
A Paradox of Inconsistent Parametric and Consistent Nonparametric Regression
By Peter C. B. Phillips and Liangjun Su