DocumentCode
1466443
Title
Wavelet Coherence for Certain Nonstationary Bivariate Processes
Author
Cohen, E.A.K. ; Walden, A.T.
Author_Institution
Dept. of Math., Imperial Coll. London, London, UK
Volume
59
Issue
6
fYear
2011
fDate
6/1/2011 12:00:00 AM
Firstpage
2522
Lastpage
2531
Abstract
A previous study considered the estimation of wavelet coherence from jointly stationary time series via time-domain smoothing and use of a single Morlet wavelet. The form of the asymptotic (Goodman´s) distribution was derived. In this paper we extend this approach to nonstationary time series where the nonstationarity is induced by various types of modulation. The model forms of coherence studied include constant over time and scale, time-varying, scale-varying, and time-and-scale varying. These coherence models are carefully derived from appropriate statistical models for nonstationary processes. The portion of the signals used in calculating the coherence at a scale a depends on a ; provided its size-or equivalently the number of degrees of freedom of the estimator-is appropriate to the time variation in coherence at that scale, good estimation results are achieved. Moreover, Goodman´s distribution is seen still to be appropriate for the estimator.
Keywords
signal processing; time series; wavelet transforms; Goodman distribution; Morlet wavelet; asymptotic distribution; jointly stationary time series; nonstationary bivariate process; nonstationary time series; time-and-scale varying; time-domain smoothing; wavelet coherence; Coherence; Continuous wavelet transforms; Estimation; Frequency modulation; Smoothing methods; Time frequency analysis; Coherence; Goodman´s distribution; Morlet wavelet; nonstationary processes; temporal smoothing; wavelet coherence;
fLanguage
English
Journal_Title
Signal Processing, IEEE Transactions on
Publisher
ieee
ISSN
1053-587X
Type
jour
DOI
10.1109/TSP.2011.2123893
Filename
5725200
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