Clustered fractional Gabor transform

Zhichun Zhao; Ran Tao; Gang Li; Yue Wang

doi:10.1016/j.sigpro.2019.107240

Clustered fractional Gabor transform

Zhichun Zhao, Ran Tao^*, Gang Li, Yue Wang

^*Corresponding author for this work

Research output: Contribution to journal › Article › peer-review

9 Citations (Scopus)

Abstract

In this paper, a novel clustered fractional Gabor transform (CFrGT) is proposed by exploiting the continuity structure of the fractional Gabor spectrum. The fractional Gabor expansion is reformulated under a Bayesian framework with correlated priors. To encourage the nonzero or zero coefficients to cluster in a spatial consistent constraint, the Markov random field (MRF) model is incorporated as the prior for the support of the fractional Gabor spectrum. And then the variational Bayes expectation-maximization algorithm is used to approximate the posterior of the hidden variables and estimate the parameters of MRF model. The proposed algorithm achieves high time-frequency resolution and localization under noisy and low sampling scenarios. Both the synthetic and the real data experimental results verify the effectiveness and its superiority over the conventional fractional Gabor transform.

Original language	English
Article number	107240
Journal	Signal Processing
Volume	166
DOIs	https://doi.org/10.1016/j.sigpro.2019.107240
Publication status	Published - Jan 2020

Keywords

Cluster structure
Fractional Gabor transform (FrGT)
Markov random field (MRF)
Time-frequency analysis
Variational Bayes expectation-maximization (VBEM)

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10.1016/j.sigpro.2019.107240

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Zhao, Z., Tao, R., Li, G., & Wang, Y. (2020). Clustered fractional Gabor transform. Signal Processing, 166, Article 107240. https://doi.org/10.1016/j.sigpro.2019.107240

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title = "Clustered fractional Gabor transform",

abstract = "In this paper, a novel clustered fractional Gabor transform (CFrGT) is proposed by exploiting the continuity structure of the fractional Gabor spectrum. The fractional Gabor expansion is reformulated under a Bayesian framework with correlated priors. To encourage the nonzero or zero coefficients to cluster in a spatial consistent constraint, the Markov random field (MRF) model is incorporated as the prior for the support of the fractional Gabor spectrum. And then the variational Bayes expectation-maximization algorithm is used to approximate the posterior of the hidden variables and estimate the parameters of MRF model. The proposed algorithm achieves high time-frequency resolution and localization under noisy and low sampling scenarios. Both the synthetic and the real data experimental results verify the effectiveness and its superiority over the conventional fractional Gabor transform.",

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author = "Zhichun Zhao and Ran Tao and Gang Li and Yue Wang",

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year = "2020",

month = jan,

doi = "10.1016/j.sigpro.2019.107240",

language = "English",

volume = "166",

journal = "Signal Processing",

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T1 - Clustered fractional Gabor transform

AU - Zhao, Zhichun

AU - Tao, Ran

AU - Li, Gang

AU - Wang, Yue

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N2 - In this paper, a novel clustered fractional Gabor transform (CFrGT) is proposed by exploiting the continuity structure of the fractional Gabor spectrum. The fractional Gabor expansion is reformulated under a Bayesian framework with correlated priors. To encourage the nonzero or zero coefficients to cluster in a spatial consistent constraint, the Markov random field (MRF) model is incorporated as the prior for the support of the fractional Gabor spectrum. And then the variational Bayes expectation-maximization algorithm is used to approximate the posterior of the hidden variables and estimate the parameters of MRF model. The proposed algorithm achieves high time-frequency resolution and localization under noisy and low sampling scenarios. Both the synthetic and the real data experimental results verify the effectiveness and its superiority over the conventional fractional Gabor transform.

AB - In this paper, a novel clustered fractional Gabor transform (CFrGT) is proposed by exploiting the continuity structure of the fractional Gabor spectrum. The fractional Gabor expansion is reformulated under a Bayesian framework with correlated priors. To encourage the nonzero or zero coefficients to cluster in a spatial consistent constraint, the Markov random field (MRF) model is incorporated as the prior for the support of the fractional Gabor spectrum. And then the variational Bayes expectation-maximization algorithm is used to approximate the posterior of the hidden variables and estimate the parameters of MRF model. The proposed algorithm achieves high time-frequency resolution and localization under noisy and low sampling scenarios. Both the synthetic and the real data experimental results verify the effectiveness and its superiority over the conventional fractional Gabor transform.

KW - Cluster structure

KW - Fractional Gabor transform (FrGT)

KW - Markov random field (MRF)

KW - Time-frequency analysis

KW - Variational Bayes expectation-maximization (VBEM)

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DO - 10.1016/j.sigpro.2019.107240

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SN - 0165-1684

VL - 166

JO - Signal Processing

JF - Signal Processing

M1 - 107240

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Clustered fractional Gabor transform

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