Breaks or long memory behavior: An empirical investigation

Are structural break models true switching models or long memory processes? The answer to this question remains ambiguous. In recent years, many papers have dealt with this problem. Some studies have shown that, under specific conditions, switching models and long memory processes can easily be confused. In this paper, using several generating models (the mean-plus-noise model, the stochastic permanent break model, the Markov switching model, the threshold autoregressive (TAR) model, the sign model, and the structural change model) and several estimation techniques (the Geweke–Porter–Hudak (GPH) technique, detrended fluctuation analysis (DFA), the exact local Whittle (ELW) method, and wavelet methods) we show that, even if the answer is quite simple in some cases, it can be mitigated in other cases. Using French and American inflation rates, we found that the most appropriate process that takes into account the important features of these series is a model that simultaneously combines changes in regimes and long memory behavior. The main result of this study indicates that estimating a long memory parameter without taking into account the presence of breaks in the data sets may lead to misspecification and hence to overestimating the true parameter.

[1]  C. Peng,et al.  Mosaic organization of DNA nucleotides. , 1994, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.

[2]  C. Granger,et al.  A long memory property of stock market returns and a new model , 1993 .

[3]  C. Granger,et al.  Occasional structural breaks and long memory with an application to the S&P 500 absolute stock returns , 2004 .

[4]  Uwe Hassler,et al.  Long Memory in Inflation Rates: International Evidence , 1995 .

[5]  H. Stanley,et al.  Effect of nonlinear filters on detrended fluctuation analysis. , 2004, Physical review. E, Statistical, nonlinear, and soft matter physics.

[6]  Howell Tong,et al.  Threshold Models in Time Series Analysis-30 Years On , 2011 .

[7]  Rohit S. Deo,et al.  The mean squared error of Geweke and Porter‐Hudak's estimator of the memory parameter of a long‐memory time series , 1998 .

[8]  C. Granger,et al.  Varieties of long memory models , 1996 .

[9]  R. Quandt Tests of the Hypothesis That a Linear Regression System Obeys Two Separate Regimes , 1960 .

[10]  Marine Carrasco,et al.  Misspecified Structural Change, Threshold, and Markov-switching models , 2002 .

[11]  J. Geweke,et al.  THE ESTIMATION AND APPLICATION OF LONG MEMORY TIME SERIES MODELS , 1983 .

[12]  H E Stanley,et al.  Analysis of clusters formed by the moving average of a long-range correlated time series. , 2004, Physical review. E, Statistical, nonlinear, and soft matter physics.

[13]  Timo Teräsvirta,et al.  A simple nonlinear time series model with misleading linear properties , 1999 .

[14]  Mark J. Jensen An Approximate Wavelet MLE of Short- and Long-Memory Parameters , 1999 .

[15]  Marius Ooms,et al.  Inference and Forecasting for ARFIMA Models With an Application to US and UK Inflation , 2004 .

[16]  R. Quandt The Estimation of the Parameters of a Linear Regression System Obeying Two Separate Regimes , 1958 .

[17]  D. Dickey,et al.  Testing for unit roots in autoregressive-moving average models of unknown order , 1984 .

[18]  Robert F. Engle,et al.  The Reviewof Economicsand Statistics , 1999 .

[19]  H. Stanley,et al.  Detrended cross-correlation analysis: a new method for analyzing two nonstationary time series. , 2007, Physical review letters.

[20]  Murad S. Taqqu,et al.  Theory and applications of long-range dependence , 2003 .

[21]  H. Stanley,et al.  Quantifying cross-correlations using local and global detrending approaches , 2009 .

[22]  F. Diebold,et al.  Long Memory and Regime Switching , 2000 .

[23]  Benoît Mojon,et al.  Breaks in the Mean of Inflation: How They Happen and What to Do with Them , 2005, SSRN Electronic Journal.

[24]  Mark C. Strazicich,et al.  Minimum Lagrange Multiplier Unit Root Test with Two Structural Breaks , 2003, Review of Economics and Statistics.

[25]  H. Stanley,et al.  Quantifying signals with power-law correlations: a comparative study of detrended fluctuation analysis and detrended moving average techniques. , 2004, Physical review. E, Statistical, nonlinear, and soft matter physics.

[26]  Serena Ng,et al.  Unit Root Tests in ARMA Models with Data-Dependent Methods for the Selection of the Truncation Lag , 1995 .

[27]  Inflation rates; long-memoray, level shifts, or both? , 2002 .

[28]  É. Moulines,et al.  Log-Periodogram Regression Of Time Series With Long Range Dependence , 1999 .

[29]  James D. Hamilton A New Approach to the Economic Analysis of Nonstationary Time Series and the Business Cycle , 1989 .

[30]  G. C. Tiao,et al.  Random Level-Shift Time Series Models, ARIMA Approximations, and Level-Shift Detection , 1990 .

[31]  P. Perron,et al.  Estimating and testing linear models with multiple structural changes , 1995 .

[32]  H. Stanley,et al.  Cross-correlations between volume change and price change , 2009, Proceedings of the National Academy of Sciences.

[33]  P. Perron,et al.  The Great Crash, The Oil Price Shock And The Unit Root Hypothesis , 1989 .

[34]  Josep Lluís Carrion‐i‐Silvestre,et al.  GLS-BASED UNIT ROOT TESTS WITH MULTIPLE STRUCTURAL BREAKS UNDER BOTH THE NULL AND THE ALTERNATIVE HYPOTHESES , 2009, Econometric Theory.

[35]  Christian Gourieroux,et al.  Memory and infrequent breaks , 2001 .

[36]  G. Kapetanios,et al.  Structural Breaks in Inflation Dynamics , 2003 .

[37]  P. Robinson,et al.  Semiparametric exploration of long memory in stock prices , 1996 .

[38]  B. Hansen Threshold autoregression in economics , 2011 .

[39]  Robin L. Lumsdaine,et al.  Multiple Trend Breaks and the Unit-Root Hypothesis , 1997, Review of Economics and Statistics.

[40]  Jushan Bai,et al.  A NOTE ON SPURIOUS BREAK , 1998, Econometric Theory.

[41]  C. Granger,et al.  AN INTRODUCTION TO LONG‐MEMORY TIME SERIES MODELS AND FRACTIONAL DIFFERENCING , 1980 .

[42]  Ying-Wong Cheung,et al.  Long Memory in Foreign-Exchange Rates , 1993 .

[43]  Jin Lee Estimating memory parameter in the US inflation rate , 2005 .

[44]  Yoshihiro Yajima,et al.  A CENTRAL LIMIT THEOREM OF FOURIER TRANSFORMS OF STRONGLY DEPENDENT STATIONARY PROCESSES , 1989 .

[45]  Jan Beran,et al.  Statistics for long-memory processes , 1994 .

[46]  Peter C. B. Phillips,et al.  Exact Local Whittle Estimation of Fractional Integration , 2002 .

[47]  Mark J. Jensen,et al.  Time-Varying Long-Memory in Volatility: Detection and Estimation with Wavelets , 2000 .

[48]  Dominique Guegan,et al.  Which is the best model for the US inflation rate: a structural changes model or a long memory process , 2007 .

[49]  D. Andrews,et al.  Further Evidence on the Great Crash, the Oil-Price Shock, and the Unit-Root Hypothesis , 1992 .

[50]  Dominique Guégan,et al.  How can we Define the Concept of Long Memory? An Econometric Survey , 2005 .

[51]  H. R. Kuensch Statistical Aspects of Self-Similar Processes , 1986 .

[52]  P. Phillips Testing for a Unit Root in Time Series Regression , 1988 .

[53]  P. Perron,et al.  Computation and Analysis of Multiple Structural-Change Models , 1998 .