An optimally concentrated Gabor transform for localized time-frequency components

Ricaud, Benjamin; Stempfel, Guillaume; Torrésani, Bruno; Wiesmeyr, Christoph; Lachambre, Hélène; Onchiş, Darian M.

doi:10.1007/s10444-013-9337-9

Cited by 18 publications

(20 citation statements)

References 16 publications

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“…Several attempts have been proposed in the literature to balance between different window bandwidths. For example, in [32,43], the TFJP was proposed to select the optimal window for the GT based on the Rényi entropy [20]; in [4], the NSGT depends on a frame associated with a non-uniform grid on the TF plane, which comes from the information provided by the signal. The frame could be viewed as the "optimal window" for the GT.…”

Section: Time-varying Optimal Window Widthsmentioning

confidence: 99%

“…However, they suffer from severe mode mixing artifacts [25]. There are several nonlinear-type transforms including: the reassignment method (RM) [11,3] and its variations, the TF by convex optimization (Tycoon) [33], the Blaschke decomposition (BKD) [18,19], the empirical mode decomposition (EMD) [30], the iterative filtering [17], the sparsification approach [29], the approximation approach [16], the TF jigsaw puzzle (TFJP) for the Gabor transform (GT) [32,43], the non-stationary GT (NSGT) [5], the matching pursuit [37], and several others. The variations of RM include: the synchrosqueezing transform (SST) [22,53], the synchrosqueezed wave packet transform [54], the synchrosqueezed S-transform [31], the second-order SST [41], the concentration of frequency and time (ConceFT) [23], and the deshape SST [36].…”

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confidence: 99%

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Entropy-based time-varying window width selection for nonlinear-type time–frequency analysis

Sheu

Hsu

Chou

et al. 2017

Int J Data Sci Anal

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We propose a time-varying optimal window width (TVOWW) and an adaptive optimal window width selection schemes to optimize the performance of several nonlineartype time-frequency analyses, including the reassignment method and its variations. A window rendering the most concentrated distribution in the time-frequency representation is regarded as the optimal window. The TVOWW selection scheme is particularly useful for signals that comprise fastvarying instantaneous frequencies and small spectral gaps. To demonstrate the efficacy of the method, in addition to analyzing synthetic signals, we study an atomic time-varying dipole moment driven by two-color mid-infrared laser fields in attosecond physics and near-threshold harmonics of a hydrogen atom in the strong laser field.

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Section: Time-varying Optimal Window Widthsmentioning

confidence: 99%

mentioning

confidence: 99%

Entropy-based time-varying window width selection for nonlinear-type time–frequency analysis

Sheu

Hsu

Chou

et al. 2017

Int J Data Sci Anal

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“…The main tool for time-frequency analysis is the Short-Time Fourier Transform, defined for functions f, g ∈ L 2 (ℝ d ) at λ = (α, β) ∈ ℝ 2d by (2) where T α f (t) = f (t − α) is the translation (time shift) and M β f(t) = e 2πiβ·t f(t) is the modulation (frequency shift). The operators π(λ) := M β T α are called time-frequency shifts and the set is a lattice, [11]. The Gabor system (g, Λ) = {π(λ)g; λ ∈ Λ} over the lattice Λ consisting of the translated and modulated versions of one atom g, is a frame for the space L 2 (ℝ d ), if and only if there exist 0 < A ≤ B < ∞ (frame bounds) with (3) We will use in the construction of Gabor frames the Alltop sequences as proposed in [8].…”

Section: Gabor Frames and The ℓ 1 -Minimizationmentioning

confidence: 99%

On Homotopy Continuation for Speech Restoration

Onchiş

Real

2016

Computational Topology in Image Context

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In this paper, a homotopy-based method is employed for the recovery of speech recordings from missing or corrupted samples taken in a noisy environment. The model for the acquisition device is a compressed sensing scenario using Gabor frames. To recover an approximation of the speech file, we used the basis pursuit denoising method with the homotopy continuation algorithm. We tested the proposed method with various speech recordings.

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“…Recently, various advances have emerged in fast computing algorithms for discrete Gabor transform [2], [3] and fast computing algorithms for real-valued discrete Gabor transform [4]- [8]. There has also been an expanding scope of applications which include for examples, audio processing [9]- [11], speech processing [12], ultrasound processing [13], noise reduction for NMR FID signals [14], image processing [15]- [17], face recognition [18], [19], object recognition [20], [21], and so on. However, due to the Heisenberg uncertainty principle, the Gabor representation with a single window is insufficient to analyze signals with dynamic timefrequency components.…”

Section: Introductionmentioning

confidence: 99%

Parallel Lattice Structure for Dual Windows Computation in Multiwindow Gabor Transform

Kwan

2019

IEEE Access

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The multiwindow discrete Gabor transform (M-DGT) is a useful time-frequency analysis tool for non-stationary signal processing. Given an arbitrary Gabor frame, a parallel lattice structure of block time-recursive algorithm for fast and efficient computation of dual/analysis Gabor windows for M-DGT is presented. By using a multiple window dual Gabor frame, the dual Gabor windows can be expressed by synthesis and analysis windows with a block-circulant matrix. Then, a parallel lattice structure of block time-recursive can be derived to solve the dual Gabor windows by the block-circulant matrix computed by the fast discrete Fourier transform (FFT). When compared to three existing methods, the proposed algorithm can reduce computational complexity and save computational time. Experimental results indicate that the proposed algorithm is valid to compute the dual windows of the M-DGT, which make the algorithm attractive for fast time-frequency signal analysis and processing. INDEX TERMS Multiwindow discrete Gabor transform (M-DGT), parallel lattice structure, block timerecursive methods, dual (analysis) Gabor windows, block-circulant matrix, time-frequency analysis.

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An optimally concentrated Gabor transform for localized time-frequency components

Cited by 18 publications

References 16 publications

Entropy-based time-varying window width selection for nonlinear-type time–frequency analysis

Entropy-based time-varying window width selection for nonlinear-type time–frequency analysis

On Homotopy Continuation for Speech Restoration

Parallel Lattice Structure for Dual Windows Computation in Multiwindow Gabor Transform

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