On Confidence Intervals for Autoregressive Roots and Predictive Regression

Local to unity limit theory is used in applications to construct confidence intervals (CIs) for autoregressive roots through inversion of a unit root test (Stock (1991)). Such CIs are asymptotically valid when the true model has an autoregressive root that is local to unity (ρ = 1 + c/n), but are shown here to be invalid at the limits of the domain of definition of the localizing coefficient c because of a failure in tightness and the escape of probability mass. Failure at the boundary implies that these CIs have zero asymptotic coverage probability in the stationary case and vicinities of unity that are wider than O(n-super-−1/3). The inversion methods of Hansen (1999) and Mikusheva (2007) are asymptotically valid in such cases. Implications of these results for predictive regression tests are explored. When the predictive regressor is stationary, the popular Campbell and Yogo (2006) CIs for the regression coefficient have zero coverage probability asymptotically, and their predictive test statistic Q erroneously indicates predictability with probability approaching unity when the null of no predictability holds. These results have obvious cautionary implications for the use of the procedures in empirical practice.

[1]  Peter C. B. Phillips,et al.  Statistical Inference in Instrumental Variables Regression with I(1) Processes , 1990 .

[2]  Bruce E. Hansen,et al.  The Grid Bootstrap and the Autoregressive Model , 1999, Review of Economics and Statistics.

[3]  Peter C. B. Phillips,et al.  Towards a Unified Asymptotic Theory for Autoregression , 1987 .

[4]  Peter C. B. Phillips,et al.  Predictive regression under various degrees of persistence and robust long-horizon regression , 2013 .

[5]  M. Kendall,et al.  The advanced theory of statistics , 1945 .

[6]  James H. Stock Confidence Intervals for the Largest Autoresgressive Root in U.S. Macroeconomic Time Series , 1991 .

[7]  C. Z. Wei,et al.  Asymptotic Inference for Nearly Nonstationary AR(1) Processes , 1987 .

[8]  Condence intervals for autoregressive coe"cients near one , 2001 .

[9]  P. Phillips,et al.  Uniform Limit Theory for Stationary Autoregression , 2004 .

[10]  Limit Theory for Moderate Deviations from a Unit Root Under Weak Dependence , 2005 .

[11]  P. Phillips Econometric Inference in the Vicinity of Unity. 1 , 2009 .

[12]  Anna Mikusheva Uniform Inference in Autoregressive Models , 2007 .

[13]  G Kendall Maurice,et al.  The Advanced Theory Of Statistics Vol-i , 1943 .

[14]  Peter C. B. Phillips,et al.  Limit Theory for Moderate Deviations from a Unit Root , 2004 .

[15]  Alexandros Kostakis,et al.  Robust Econometric Inference for Stock Return Predictability , 2011 .

[16]  Graham Elliott,et al.  Confidence Intervals for Autoregressive Coefficients Near One , 2000 .

[17]  P. Phillips,et al.  Smoothing Local-to-Moderate Unit Root Theory , 2008 .

[18]  P. Phillips,et al.  Nonparametric Predictive Regression , 2012 .

[19]  D. Andrews Exactly Median-Unbiased Estimation of First Order Autoregressive/Unit Root Models , 1993 .

[20]  Graham Elliott,et al.  Inference in Models with Nearly Integrated Regressors , 1995, Econometric Theory.

[21]  J. Stock,et al.  Confidence Intervals for the Largest Autoresgressive Root in U.S. Macroeconomic Time Series , 1991 .

[22]  Victor Solo,et al.  Asymptotics for Linear Processes , 1992 .

[23]  James R. Carpenter,et al.  Test inversion bootstrap confidence intervals , 1999 .