Title :
2D Hilbert-Huang Transform
Author :
Schmitt, J. ; Pustelnik, Nelly ; Borgnat, Pierre ; Flandrin, Patrick
Author_Institution :
Lab. de Phys., Univ. de Lyon, Lyon, France
Abstract :
This paper presents a 2D transposition of the Hilbert-Huang Transform (HHT), an empirical data analysis method designed for studying instantaneous amplitudes and phases of non-stationary data. The principle is to adaptively decompose an image into oscillating parts called Intrinsic Mode Functions (IMFs) using an Empirical Mode Decomposition method (EMD), and then to perform Hilbert spectral analysis on the IMFs in order to recover local amplitudes and phases. For the decomposition step, we propose a new 2D mode decomposition method based on non-smooth convex optimization, while for the instantaneous spectral analysis, we use a 2D transposition of Hilbert spectral analysis called monogenic analysis, based on Riesz transform and allowing to extract instantaneous amplitudes, phases, and orientations. The resulting 2D-HHT is validated on simulated data.
Keywords :
Hilbert transforms; convex programming; feature extraction; 2D Hilbert-Huang transform; 2D transposition; EMD; HHT; Hilbert spectral analysis; IMF; Riesz transform; empirical data analysis method; empirical mode decomposition method; image deomposition; instantaneous amplitudes; instantaneous spectral analysis; intrinsic mode functions; monogenic analysis; nonsmooth convex optimization; nonstationary data phase; Algorithm design and analysis; Convex functions; Empirical mode decomposition; Market research; Robustness; Spectral analysis; Hilbert-Huang Transform; Riesz transform; convex optimization; empirical mode decomposition; monogenic analysis; proximal algorithms;
Conference_Titel :
Acoustics, Speech and Signal Processing (ICASSP), 2014 IEEE International Conference on
Conference_Location :
Florence
DOI :
10.1109/ICASSP.2014.6854630
