Characterize highly oscillating frequency modulation using generalized Warblet transform

Characterize highly oscillating frequency modulation using generalized Warblet transform

In this paper, in order to characterize highly oscillating time-frequency patterns of signals, whose instantaneous frequency (IF) is periodic or non-periodic, a generalized Warblet transform (GWT) is proposed. By replacing sine function kernel of conventional Warblet transform with Fourier series fu...

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Bibliographic Details
Published in:Mechanical systems and signal processing Vol. 26; no. JAN; pp. 128 - 140
Main Authors: Yang, Y., Peng, Z.K., Meng, G., Zhang, W.M.
Format: Journal Article
Language:English
Published: Kidlington Elsevier Ltd 2012
Elsevier
Subjects:
Chirplet transform
Exact sciences and technology
Fourier series
Fundamental areas of phenomenology (including applications)
Generalized Warblet transform time-frequency analysis
Instantaneous frequency
Intermediate frequency
Mathematical analysis
Mathematical models
Mechanical systems
Oscillating
Physics
Solid mechanics
Structural and continuum mechanics
Transforms
Vibration
Vibration, mechanical wave, dynamic stability (aeroelasticity, vibration control...)
Warblet transform
Chirplet transform
Instantaneous frequency
Warblet transform
Generalized Warblet transform time-frequency analysis
Frequency modulation
Fourier transformation
Vibration
Time frequency domain method
Chirp pulse
Iterative method
Experimental study
Fourier series
Modeling
Kernel function
Shaft
Signal processing
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Summary:In this paper, in order to characterize highly oscillating time-frequency patterns of signals, whose instantaneous frequency (IF) is periodic or non-periodic, a generalized Warblet transform (GWT) is proposed. By replacing sine function kernel of conventional Warblet transform with Fourier series function, the GWT is able to generate a time-frequency representation (TFR) with satisfying energy concentration for such signals. As any oscillating function can be well approximated by a Fourier series, the GWT is guaranteed to provide an effective way to achieve accurate IF estimation. In addition, a signal-dependent iterative procedure for coefficients estimation is developed to enable the GWT to be applied in practice. Using the Fourier spectrum of the IF, the coefficients of the Fourier series kernel function of the GWT can be estimated and refined adaptively. The effectiveness of the proposed method is verified through comparing with other time-frequency analysis methods on several numerical examples and experimental vibration signal, which is collected from a rotor test rig undergoing speed-up and slow-down stages. ► We proposed a time frequency analysis method, named as generalized Warblet transform (GWT). ► We developed an iterative procedure to determine the coefficients of the kernel function for the GWT. ► We examined the effectiveness of the GWT.
Bibliography:ObjectType-Article-2
SourceType-Scholarly Journals-1
ObjectType-Feature-1
content type line 23
ISSN:0888-3270
1096-1216
DOI:10.1016/j.ymssp.2011.06.020