Bootstrapping Smooth Functions of Slope Parameters and Innovation Variances in VAR(∞) Models

It is common to conduct bootstrap inference in vector autoregressive (VAR) models based on the assumption that the underlying data-generating process is of finite-lag order. This assumption is implausible in practice. We establish the asymptotic validity of the residual-based bootstrap method for smooth functions of VAR slope parameters and innovation variances under the alternative assumption that a sequence of finite-lag order VAR models is fitted to data generated by a VAR process of possibly infinite order. This class of statistics includes measures of predictability and orthogonalized impulse responses and variance decompositions. Our approach provides an alternative to the use of the asymptotic normal approximation and can be used even in the absence of closed-form solutions for the variance of the estimator. We illustrate the practical relevance of our findings for applied work, including the evaluation of macroeconomic models.

[1]  F. Canova,et al.  Sources and propagation of international output cycles: Common shocks or transmission? , 1998 .

[2]  M. Watson Measures of Fit for Calibrated Models , 1991, Journal of Political Economy.

[3]  Stefan Mittnik,et al.  Misspecifications in vector autoregressions and their effects on impulse responses and variance decompositions , 1993 .

[4]  E. Paparoditis Bootstrapping Autoregressive and Moving Average Parameter Estimates of Infinite Order Vector Autoregressive Processes , 1996 .

[5]  Mark W. Watson,et al.  Money, Prices, Interest Rates and the Business Cycle , 1996 .

[6]  P. Hall,et al.  Martingale Limit Theory and Its Application , 1980 .

[7]  A. Bose Edgeworth correction by bootstrap in autoregressions , 1988 .

[8]  J. Galí,et al.  Technology, Employment, and the Business Cycle: Do Technology Shocks Explain Aggregate Fluctuations , 1996 .

[9]  Jeremy Berkowitz,et al.  Recent developments in bootstrapping time series , 1996 .

[10]  H. White,et al.  A Unified Theory of Estimation and Inference for Nonlinear Dynamic Models , 1988 .

[11]  Robert B. Barsky,et al.  The Fisher Hypothesis and the Forecastability and Persistence of Inflation , 1986 .

[12]  P. Bühlmann Sieve bootstrap for time series , 1997 .

[13]  Stephen G. Cecchetti,et al.  Inflation and Uncertainty at Short and Long Horizons , 1990 .

[14]  Julio J. Rotemberg,et al.  Real-Business-Cycle Models and the Forecastable Movements in Output, Hours, and Consumption , 1996 .

[15]  Helmut Lütkepohl,et al.  Estimating Orthogonal Impulse Responses via Vector Autoregressive Models , 1991, Econometric Theory.

[16]  Peter A. Zadrozny,et al.  Asymptotic distributions of impulse responses, step responses, and variance decompositions of estimated linear dynamic models , 1993 .

[17]  Francis X. Diebold,et al.  Measuring Predictability: Theory and Macroeconomic Applications , 1997 .

[18]  Eric M. Leeper,et al.  Toward a Modern Macroeconomic Model Usable for Policy Analysis , 1994, NBER Macroeconomics Annual.

[19]  Julio J. Rotemberg,et al.  An Optimization-Based Econometric Framework for the Evaluation of Monetary Policy , 1997, NBER Macroeconomics Annual.

[20]  Lutz Kilian,et al.  Finite-Sample Properties of Percentile and Percentile-t Bootstrap Confidence Intervals for Impulse Responses , 1999, Review of Economics and Statistics.

[21]  J. Davidson Stochastic Limit Theory , 1994 .

[22]  Thomas F. Cooley,et al.  Business cycle analysis without much theory A look at structural VARs , 1998 .

[23]  Timothy Cogley,et al.  Output Dynamics in Real-Business-Cycle Models , 1993 .

[24]  Stephen G. Cecchetti,et al.  Inflation and Uncertainty at Long and Short Horizons , 1990 .

[25]  L. Kilian,et al.  On the Finite Sample Accuracy of Nonparametric Resampling Algorithms for Economic Time Series , 1999 .

[26]  L. Kilian Small-sample Confidence Intervals for Impulse Response Functions , 1998, Review of Economics and Statistics.

[27]  Francis X. Diebold,et al.  Dynamic Equilibrium Economies: A Framework for Comparing Models and Data , 1995 .

[28]  E. Giné,et al.  Bootstrapping General Empirical Measures , 1990 .

[29]  J. Fox Bootstrapping Regression Models , 2002 .

[30]  J. Davidson Stochastic Limit Theory: An Introduction for Econometricians , 1994 .

[31]  Stephanie Schmitt-Grohé The international transmission of economic fluctuations:: Effects of U.S. business cycles on the Canadian economy , 1998 .

[32]  E. Paparoditis,et al.  ORDER IDENTIFICATION STATISTICS IN STATIONARY AUTOREGRESSIVE MOVING‐AVERAGE MODELS:VECTOR AUTOCORRELATIONS AND THE BOOTSTRAP , 1992 .

[33]  P. Hall,et al.  Martingale Limit Theory and its Application. , 1984 .

[34]  Helmut Lütkepohl,et al.  Asymptotic Distributions of Impulse Response Functions and Forecast Error Variance Decompositions of Vector Autoregressive Models , 1990 .

[35]  Peter Bühlmann,et al.  Moving-average representation of autoregressive approximations , 1995 .