On Bias in the Estimation of Structural Break Points

Based on the Girsanov theorem, this paper obtains the exact finite sample distribution of the maximum likelihood estimator of structural break points in a continuous time model. The exact finite sample theory suggests that, in empirically realistic situations, there is a strong finite sample bias in the estimator of structural break points. This property is shared by least squares estimator of both the absolute structural break point and the fractional structural break point in discrete time models. A simulation-based method based on the indirect estimation approach is proposed to reduce the bias both in continuous time and discrete time models. Monte Carlo studies show that the indirect estimation method achieves substantial bias reductions. However, since the binding function has a slope less than one, the variance of the indirect estimator is larger than that of the original estimator.

[1]  Stelios Arvanitis,et al.  On the Validity of Edgeworth Expansions and Moment Approximations for Three Indirect Inference Estimators , 2018 .

[2]  ECONOMETRIC ANALYSIS OF CONTINUOUS TIME MODELS: A SURVEY OF PETER PHILLIPS’S WORK AND SOME NEW RESULTS , 2014, Econometric Theory.

[3]  Jun Yu Bias in the estimation of the mean reversion parameter in continuous time models , 2012 .

[4]  P. Phillips Folklore Theorems, Implicit Maps, and Indirect Inference , 2012 .

[5]  J. Bai,et al.  Common breaks in means and variances for panel data , 2010 .

[6]  P. Phillips,et al.  Maximum Likelihood and Gaussian Estimation of Continuous Time Models in Finance , 2007 .

[7]  P. Phillips,et al.  Simulation-Based Estimation of Contingent-Claims Prices , 2007 .

[8]  E. Ghysels,et al.  Structural Breaks in Financial Time Series , 2006 .

[9]  Christian Gourieroux,et al.  Indirect Inference for Dynamic Panel Models , 2006 .

[10]  Pierre Perron,et al.  Dealing with Structural Breaks , 2005 .

[11]  Yong Bao,et al.  The Second-Order Bias and Mean Squared Error of Estimators in Time Series Models , 2007 .

[12]  Melvyn J. Weeks,et al.  Simulation-based Inference in Econometrics: Simulation-based inference in econometrics: methods and applications , 2008 .

[13]  Arjun K. Gupta,et al.  Parametric Statistical Change Point Analysis , 2000 .

[14]  J. Stock,et al.  Testing for and Dating Common Breaks in Multivariate Time Series , 1998 .

[15]  L. Horváth,et al.  Limit Theorems in Change-Point Analysis , 1997 .

[16]  J. Bai,et al.  Estimation of a Change Point in Multiple Regression Models , 1997, Review of Economics and Statistics.

[17]  J. Bai,et al.  Estimating Multiple Breaks One at a Time , 1997, Econometric Theory.

[18]  James G. MacKinnon,et al.  Approximate bias correction in econometrics , 1998 .

[19]  Aman Ullah,et al.  The second-order bias and mean squared error of nonlinear estimators , 1996 .

[20]  A. Gallant,et al.  Which Moments to Match? , 1995, Econometric Theory.

[21]  N. Touzi,et al.  Calibrarion By Simulation for Small Sample Bias Correction , 1996 .

[22]  J. Bai,et al.  Least Absolute Deviation Estimation of a Shift , 1995, Econometric Theory.

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

[24]  P. K. Bhattacharya,et al.  Some aspects of change-point analysis , 1994 .

[25]  J. Bai,et al.  Least squares estimation of a shift in linear processes , 1994 .

[26]  Anthony A. Smith,et al.  Estimating Nonlinear Time-Series Models Using Simulated Vector Autoregressions , 1993 .

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

[28]  P. Hall The Bootstrap and Edgeworth Expansion , 1992 .

[29]  D. Pollard,et al.  Cube Root Asymptotics , 1990 .

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

[31]  S. Panchapakesan,et al.  Inference about the Change-Point in a Sequence of Random Variables: A Selection Approach , 1988 .

[32]  M. Nerlove,et al.  Biases in dynamic models with fixed effects , 1988 .

[33]  P. K. Bhattacharya Maximum likelihood estimation of a change-point in the distribution of independent random variables: General multiparameter case , 1987 .

[34]  Yi-Ching Yao,et al.  Approximating the Distribution of the Maximum Likelihood Estimate of the Change-Point in a Sequence of Independent Random Variables , 1987 .

[35]  D. L. Hawkins A simple least squares method for estimating a change in mean , 1986 .

[36]  P. K. Bhattacharya,et al.  The minimum of an additive process with applications to signal estimation and storage theory , 1976 .

[37]  David V. Hinkley,et al.  Inference about the change-point in a sequence of binomial variables , 1970 .

[38]  D. Hinkley Inference about the intersection in two-phase regression , 1969 .

[39]  H. Chernoff,et al.  ESTIMATING THE CURRENT MEAN OF A NORMAL DISTRIBUTION WHICH IS SUBJECTED TO CHANGES IN TIME , 1964 .

[40]  Le Cam,et al.  Locally asymptotically normal families of distributions : certain approximations to families of distributions & thier use in the theory of estimation & testing hypotheses , 1960 .

[41]  A. Rényi,et al.  Generalization of an inequality of Kolmogorov , 1955 .

[42]  Maurice G. Kendall,et al.  NOTE ON BIAS IN THE ESTIMATION OF AUTOCORRELATION , 1954 .

[43]  D. Politis,et al.  Statistical Estimation , 2022 .