Multiscale detection and location of multiple variance changes in the presence of long memory

Procedures for detecting change points in sequences of correlated observations (e.g., time series) can help elucidate their complicated structure. Current literature on the detection of multiple change points emphasizes the analysis of sequences of independent random variables. We address the problem of an unknown number of variance changes in the presence of long-range dependence (e.g., long memory processes). Our results are also applicable to time series whose spectrum slowly varies across octave bands. An iterated cumulative sum of squares procedure is introduced in order to look at the multiscale stationarity of a time series; that is, the variance structure of the wavelet coefficients on a scale by scale basis. The discrete wavelet transform enables us to analyze a given time series on a series of physical scales. The result is a partitioning of the wavelet coefficients into locally stationary regions. Simulations are performed to validate the ability of this procedure to detect and locate multiple variance changes. A ‘time’ series of vertical ocean shear measurements is also analyzed, where a variety of nonstationary features are identified.

[1]  D. Hinkley Inference about the change-point from cumulative sum tests , 1971 .

[2]  J. Durbin,et al.  Techniques for Testing the Constancy of Regression Relationships Over Time , 1975 .

[3]  D. Hsu Tests for Variance Shift at an Unknown Time Point , 1977 .

[4]  Steven A. Orszag,et al.  CBMS-NSF REGIONAL CONFERENCE SERIES IN APPLIED MATHEMATICS , 1978 .

[5]  A. N. PETTrrr A Non-parametric Approach to the Change-point Problem , 1979 .

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

[7]  Patsy Haccou,et al.  Testing for the number of change points in a sequence of exponential random variables , 1988 .

[8]  Stéphane Mallat,et al.  A Theory for Multiresolution Signal Decomposition: The Wavelet Representation , 1989, IEEE Trans. Pattern Anal. Mach. Intell..

[9]  P. Haccou,et al.  Non-parametric testing for the number of change points in a sequence of independent random variables , 1991 .

[10]  Ingrid Daubechies,et al.  Ten Lectures on Wavelets , 1992 .

[11]  A.H. Tewfik,et al.  Correlation structure of the discrete wavelet coefficients of fractional Brownian motion , 1992, IEEE Trans. Inf. Theory.

[12]  Peter Guttorp,et al.  Long-Memory Processes, the Allan Variance and Wavelets , 1994 .

[13]  G. C. Tiao,et al.  Use of Cumulative Sums of Squares for Retrospective Detection of Changes of Variance , 1994 .

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

[15]  Yazhen Wang Jump and sharp cusp detection by wavelets , 1995 .

[16]  A. Walden,et al.  Wavelet Analysis and Synthesis of Stationary Long-Memory Processes , 1996 .

[17]  Emanuel Parzen,et al.  Change-point approach to data analytic wavelet thresholding , 1996, Stat. Comput..

[18]  Arjun K. Gupta,et al.  Testing and Locating Variance Changepoints with Application to Stock Prices , 1997 .

[19]  D. Percival,et al.  Analysis of Subtidal Coastal Sea Level Fluctuations Using Wavelets , 1997 .

[20]  Brandon J. Whitcher,et al.  Assessing Nonstationary Time Series Using Wavelets , 1998 .

[21]  Jacques Duchêne,et al.  Detection and classification of multiple events in piecewise stationary signals: Comparison between autoregressive and multiscale approaches , 1999, Signal Process..

[22]  B. Schmolck Testing for homogeneity , 2000 .

[23]  P. Guttorp,et al.  Testing for homogeneity of variance in time series: Long memory, wavelets, and the Nile River , 2002 .