Your search keyword '"Complex-valued signals"' showing total 29 results

1. Empirical Bayesian inference for complex-valued signals using support-informed priors.

Author

Green, Dylan, Lindbloom, Jonathan, and Gelb, Anne

Subjects

SYNTHETIC aperture radar, BAYESIAN field theory, ULTRASONIC imaging, ACQUISITION of data, ALGORITHMS

Abstract

Recovering complex-valued images from multiple measurements of Fourier data is of interest in many application domains, such as synthetic aperture radar (SAR) and ultrasound imaging. While there are many algorithms designed to accurately reconstruct the magnitude, the phase information can be important for downstream processing such as coherent change detection. There is also increased interest in quantifying the recovery uncertainty. This investigation proposes a new empirical Bayesian inference method for recovering point estimates and samples of a complex-valued image posterior distribution from its corresponding multiple Fourier measurements. It also quantifies the uncertainty for both the magnitude and the phase. Our method uses a support-informed prior which we estimate directly from the multiple data acquisitions. In this way we allow for data compression, since only the sparse support information is required for the prior construction. Numerical examples demonstrate its ability to reduce the uncertainty in the magnitude of the recovery while also preserving phase information. [ABSTRACT FROM AUTHOR]

Published

2024

2. Sparsity-aware complex-valued least mean kurtosis algorithms.

Author

Özince, Nazım, Mengüç, Engin Cemal, and Emlek, Alper

Subjects

*COST functions, *SYSTEM identification, *KURTOSIS, *SIGNAL processing, *ALGORITHMS

Abstract

Complex-valued least mean kurtosis (CLMK) algorithm and its augmented version (ACLMK) have recently become popular as workhorse tools in the processing of complex-valued signals due to their superior performances. Unfortunately, they are not yet suitable for sparse system identification problems. In this paper, combining the well-known sparsity-promoting strategies into the cost function based on the negated kurtosis of the error signal, we introduce a suit of sparsity-aware CLMK algorithms, named l 0 -norm CLMK (l 0 -CLMK), l 0 -ACLMK, zero-attraction CLMK (ZA-CLMK), ZA-ACLMK, reweighted ZA-CLMK (RZA-CLMK), and RZA-ACLMK. Simulation results on synthetic and real-world sparse system identification scenarios in the complex domain show that the proposed algorithms outperform the existing sparsity-aware algorithms in terms of convergence rate, tracking, and steady-state error. • We design a novel family of sparsity-aware CLMK algorithms. • We leverage sparsity-promoting strategies and kurtosis cost function to design them. • Proposed sparsity-aware CLMK algorithms outperform their CLMS versions. [ABSTRACT FROM AUTHOR]

Published

2025

3. Enhancing interval-valued time series forecasting through bivariate ensemble empirical mode decomposition and optimal prediction.

Author

Tao, Zhifu, Ni, Wenqing, and Wang, Piao

Subjects

*TIME series analysis, *HILBERT-Huang transform, *FORECASTING, *PETROLEUM sales & prices, *CARBON pricing, *PREDICTION models

Abstract

Interval-valued time series (ITS) has been widely concerned by the academic community due to its outstanding performance in dealing with the uncertainty of systems. Numerous ITS forecasting studies have emerged, while the most popular method is based on "divide and conquer". For ITS analysis, bivariate empirical mode decomposition (BEMD) is currently the main tool that can simultaneously consider the interrelationships between the upper and lower limits. The concern is that, like empirical mode decomposition (EMD), BEMD suffers from mode mixing and end-point effects, which leads to unsatisfactory results of decomposition. In this paper, a bivariate ensemble empirical mode decomposition (BEEMD) method is proposed and applied to ITS forecasting, which aims at alleviating the problems mentioned above. At the same time, dynamic time warping (DTW) is used to quantize and analyze the mode mixing. Then, the effects of complex-valued signal constructions on ITS forecasting are discussed. To overcome the uncertainty and instability that may arise from a single prediction method, an optimal prediction based on the model pool is designed for sub-modes, and the final result can be obtained by simple addition. Using carbon prices, West Texas Intermediate (WTI) crude oil prices, and short-term loads, as the research objects, the results indicate that BEEMD is effective in avoiding mode mixing in BEMD, the complex-valued signal construction based on center and radius method (CRM) is more conducive to forecasting and optimal prediction can further improve forecasting accuracy. [ABSTRACT FROM AUTHOR]

Published

2024

4. A Novel Fully Complex Nonlinear Adaptive Finite Impulse Response Filter Algorithm

Author

Engin Cemal MENGÜÇ

Subjects

FIR filter CNLMK algorithm Prediction, Complex-valued signals, FIR filter CNLMK algorithm, Prediction, FIR filter, CNLMK algorithm, Engineering (General). Civil engineering (General), TA1-2040, Science, Science (General), Q1-390

Abstract

In this study, a new fully complex nonlinear adaptive finite impulse response (FIR) filter algorithm based on the complex-valued nonlinear least mean kurtosis (CNLMK) is proposed for nonlinear complex-valued signals. The performance of the proposed nonlinear adaptive FIR filter algorithm is assessed on the prediction of complex-valued signals. In addition, the performance of the proposed algorithm is compared with the complex-valued nonlinear gradient descent (CNGD) algorithm in terms of the mean square error (MSE) and the prediction gain. Simulation results clearly demonstrate that the proposed CNLMK algorithm outperforms the CNGD algorithm.

Published

2019

5. Unthresholded Recurrence Plots for Complex-Valued Representations of Narrow Band Signals

Author

Sipers, Aloys, Borm, Paul, Peeters, Ralf, Marwan, Norbert, editor, Riley, Michael, editor, Giuliani, Alessandro, editor, and Webber, Jr., Charles L., editor

Published

2014

6. An Efficient Algorithm by Kurtosis Maximization in Reference-Based Framework

Author

W. Zhao, Y. M. Wei, Y. H. Shen, Y. F. Cao, Z. G. Yuan, and P. C. Xu and W. Jian

Subjects

Blind source separation, independent component analysis, kurtosis, reference-based contrast functions, fastICA, complex-valued signals, Electrical engineering. Electronics. Nuclear engineering, TK1-9971

Abstract

This paper deals with the optimization of kurtosis for complex-valued signals in the independent component analysis (ICA) framework, where source signals are linearly and instantaneously mixed. Inspired by the recently proposed reference-based contrast schemes, a similar contrast function is put forward, based on which a new fast fixed-point (FastICA) algorithm is proposed. The new optimization method is similar in spirit to the former classical kurtosis-based FastICA algorithm but differs in the fact that it is much more efficient than the latter in terms of computational speed, which is significantly striking with large number of samples. The performance of this new algorithm is confirmed through computer simulations.

Published

2015

7. Variance analysis of unbiased complex-valued ℓp-norm minimizer.

Author

Chen, Yuan, So, Hing Cheung, Kuruoglu, Ercan Engin, and Yang, Xiao Long

Subjects

*ANALYSIS of variance, *NONLINEAR theories, *MIXTURES, *PROBABILITY density function, *SIMULATION methods & models

Abstract

Parameter estimation from noisy complex-valued measurements is a significant topic in various areas of science and engineering. In this aspect, an important goal is finding an unbiased estimator with minimum variance. Therefore, variance analysis of an estimator is desirable and of practical interest. In this paper, we concentrate on analyzing the complex-valued ℓ p -norm minimizer with p ≥ 1 . Variance formulas for the resultant nonlinear estimators in the presence of three representative bivariate noise distributions, namely, α -stable, Student's t and mixture of generalized Gaussian models, are derived. To guarantee attaining the minimum variance for each noise process, optimum selection of p is studied, in the case of known noise statistics, such as probability density function and corresponding density parameters. All our results are confirmed by simulations and are compared with the Cramér-Rao lower bound. [ABSTRACT FROM AUTHOR]

Published

2017

8. Complex variational mode decomposition for signal processing applications.

Author

Wang, Yanxue, Liu, Fuyun, Jiang, Zhansi, He, Shuilong, and Mo, Qiuyun

Subjects

*SIGNAL processing, *HILBERT transform, *TIME-frequency analysis, *MATHEMATICAL decomposition, *WHITE noise

Abstract

Complex-valued signals occur in many areas of science and engineering and are thus of fundamental interest. The complex variational mode decomposition (CVMD) is proposed as a natural and a generic extension of the original VMD algorithm for the analysis of complex-valued data in this work. Moreover, the equivalent filter bank structure of the CVMD in the presence of white noise, and the effects of initialization of center frequency on the filter bank property are both investigated via numerical experiments. Benefiting from the advantages of CVMD algorithm, its bi-directional Hilbert time-frequency spectrum is developed as well, in which the positive and negative frequency components are formulated on the positive and negative frequency planes separately. Several applications in the real-world complex-valued signals support the analysis. [ABSTRACT FROM AUTHOR]

Published

2017

9. Online censoring based complex-valued adaptive filters.

Author

Mengüç, Engin Cemal, Xiang, Min, and Mandic, Danilo P.

Subjects

*ADAPTIVE filters, *ADAPTIVE signal processing, *ELECTRONIC data processing, *CENSORSHIP, *MEAN square algorithms, *SYSTEM identification, *BIG data

Abstract

• Complex-valued adaptive filtering algorithms are proposed to reduce the cost of data processing in the complex domain. • The proposed algorithms are achieved by leveraging the advantages of the OC strategy and CASP.• They censor the less informative complex-valued data under certain rules and thus reduce the cost of data processing. • They censor the less informative complex-valued data under certain rules and thus reduce the cost of data processing. • To censor possible outliers in the complex domain, we also develop robust versions of the proposed algorithms. • This study paves the way for using the proposed algorithms to process streaming big data in the complex domain. A class of complex-valued adaptive filtering algorithms is proposed, with the aim to reduce the cost of data processing in the complex domain. This is achieved by leveraging the advantages of the online censoring (OC) strategy and complex-valued adaptive signal processing (ASP). The proposed algorithms, namely the OC based complex-valued least mean square (OC-CLMS), OC based augmented CLMS (OC-ACLMS), OC based hybrid (OC-Hybrid), OC based complex-valued recursive least square (OC-CRLS), and OC based augmented CRLS (OC-ACRLS) algorithms, censor the less informative complex-valued data under certain rules, that is, they use only the most informative data for updating weight vectors. This is shown to considerably reduce the cost of data processing for processing both circular and noncircular complex-valued signals. Moreover, to censor possible outliers in the complex domain, we also develop the robust versions of the proposed algorithms, called the ROC-CLMS, ROC-ACLMS, ROC-Hybrid, ROC-CRLS, and ROC-ACRLS algorithms. Simulation results over both system identification and real-world prediction scenarios verify the attractive properties of the proposed OC strategy based complex-valued algorithms. Moreover, this study paves the way for using the proposed algorithms to process streaming big data in the complex domain. [ABSTRACT FROM AUTHOR]

Published

2022

10. Maximization of Nonlinear Autocorrelation for Blind Source Separation of Non-stationary Complex Signals.

Author

Xu, Pengcheng, Shen, Yuehong, Jian, Wei, Zhao, Wei, and Peng, Cheng

Subjects

*BLIND source separation, *DIGITAL signal processing, *AUTOCORRELATION (Statistics), *GAUSSIAN distribution, *ORTHOGONAL frequency division multiplexing

Abstract

Blind source separation of complex-valued signals has been a vital issue especially in the field of digital communication signal processing. This paper proposes a novel method based on nonlinear autocorrelation to solve the problem. Relying on the temporal structure with nonlinear autocorrelation of the signals, the method has a potential capability of extracting non-stationary complex sources with Gaussian or non-Gaussian distribution. Most traditional methods would fail in separating this kind of sources. We also analyze the stability conditions of the method in theory. Numerical simulations on artificial complex Gaussian data and orthogonal frequency division multiplexing sources corroborate the validity and efficiency of the proposed method. Moreover, with respect to classical methods, including cumulant-based approach using the non-stationarity of variance and complexity pursuit, our method offers equally good results with lower computational cost and better robustness. Finally, experiments for the separation of real communication signals illustrate that our method has good prospects in real-world applications. [ABSTRACT FROM AUTHOR]

Published

2015

11. An Efficient Algorithm by Kurtosis Maximization in Reference-Based Framework.

Author

Wei ZHAO, Yimin WET, Yuehong SHEN, Yufan CAO, Zhigang YUAN, Pengcheng XU, and Wei JIAN

Subjects

COMPUTER simulation, ALGORITHMS, KURTOSIS, FIXED point theory, BLIND source separation, INDEPENDENT component analysis

Abstract

This paper deals with the optimization of kurtosisfor complex-valued signals in the independent component analysis (ICA) framework, where source signals are linearly and instantaneously mixed. Inspired by the recently proposed reference-based contrast schemes, a similar contrast function is put forward, based on which a new fast fixed-point (FastICA) algorithm is proposed. The new optimization method is similar in spirit to the former classical kurtosis-based FastICA algorithm but differs in the fact that it is much more efficient than the latter in terms of computational speed, which is significantly striking with large number of samples. The performance of this new algorithm is confirmed through computer simulations. [ABSTRACT FROM AUTHOR]

Published

2015

12. A Majorize-Minimize Memory Gradient method for complex-valued inverse problems.

Author

Florescu, Anisia, Chouzenoux, Emilie, Pesquet, Jean-Christophe, Ciuciu, Philippe, and Ciochina, Silviu

Subjects

*INVERSE problems, *SIGNAL processing, *IMAGE processing, *REAL variables, *ALGORITHMS, *DATA analysis

Abstract

Abstract: Complex-valued data are encountered in many application areas of signal and image processing. In the context of the optimization of functions of real variables, subspace algorithms have recently attracted much interest, owing to their efficiency for solving large-size problems while simultaneously offering theoretical convergence guarantees. The goal of this paper is to show how some of these methods can be successfully extended to the complex case. More precisely, we investigate the properties of the proposed complex-valued Majorize-Minimize Memory Gradient (3MG) algorithm. Important practical applications of these results arise in inverse problems. Here, we focus on image reconstruction in Parallel Magnetic Resonance Imaging (PMRI). The linear operator involved in the observation model then includes a subsampling operator over the k-space (2D Fourier domain) the choice of which is analyzed through our numerical results. In addition, sensitivity matrices associated with the multiple channel coils come into play. Comparisons with existing optimization methods confirm the better performance of the proposed algorithm. [Copyright &y& Elsevier]

Published

2014

13. Statistical inference for block sparsity of complex-valued signals

Author

Wang, Jianfeng, Zhou, Zhiyong, Yu, Jun, Wang, Jianfeng, Zhou, Zhiyong, and Yu, Jun

Abstract

Block sparsity is an important parameter in many algorithms to successfully recover block-sparse signals under the framework of compressive sensing. However, it is often unknown and needs to be estimated. Recently there emerges a few research work about how to estimate block sparsity of real-valued signals, while there is, to the best of our knowledge, no research that has been done for complex-valued signals. In this study, we propose a method to estimate the block sparsity of complex-valued signal. Its statistical properties are obtained and verified by simulations. In addition, we demonstrate the importance of accurately estimating the block sparsity through a sensitivity analysis.

Published

2020

14. Simulation Methodology for Inference on Physical Parameters of Complex Vector-Valued Signals.

Author

Chandna, S. and Walden, Andrew T.

Subjects

*CONFIDENCE intervals, *CIRCULANT matrices, *VECTOR-valued measures, *MATHEMATICAL statistics, *MATHEMATICAL models of oceanography

Abstract

Complex-valued vector time series occur in diverse fields such as oceanography and meteorology, and scientifically interpretable parameters may be estimated from them. We show that it is possible to make inference such as confidence intervals on these parameters using a vector-valued circulant embedding simulation method, combined with bootstrapping. We apply the methodology to three parameters of interest in oceanography, and compare the resulting simulated confidence intervals with those computed using analytic results. We conclude that the simulation scheme offers an inference approach either in the absence of theoretical distributional results, or to check the effect of nuisance parameters where theoretical results are available. [ABSTRACT FROM AUTHOR]

Published

2013

15. Bivariate Empirical Mode Decomposition.

Author

Rilling, Gabriel, Flandrin, Patrick, Gonçalves, Paulo, and Lilly, Jonathan M.

Subjects

HILBERT-Huang transform, COMPLEX variables, HILBERT transform, TIME series analysis, MATHEMATICAL statistics, PROBABILITY theory

Abstract

The empirical mode decomposition (EMD) has been introduced quite recently to adaptively decompose nonstationary and/or nonlinear time series [1]. The method being initially limited to real-valued time series, we propose here an extension to bivariate (or complex-valued) time series that generalizes the rationale underlying the EMD to the bivariate framework. Where the EMD extracts zero-mean oscillating components, the proposed bivariate extension is designed to extract zero-mean rotating components. The method is illustrated on a real-world signal, and properties of the output components are discussed. Free Matlab/C codes are available at http://perso.ens-lyon.fr/patrick.flandrin. [ABSTRACT FROM AUTHOR]

Published

2007

16. Complex Empirical Mode Decomposition.

Author

Tanaka, Toshihisa and Mandic, Danilo P.

Subjects

FOURIER transforms, FOURIER analysis, MATHEMATICAL transformations, HILBERT-Huang transform, TIME series analysis

Abstract

A method for the empirical mode decomposition (EMD) of complex-valued data is proposed. This is achieved based on the filter bank interpretation of the EMD mapping and by making use of the relationship between the positive and negative frequency component of the Fourier spectrum. The so-generated intrinsic mode functions (IMFs) are complex-valued, which facilitates the extension of the standard EMD to the complex domain. The analysis is supported by simulations on both synthetic and real-world complex-valued signals. [ABSTRACT FROM AUTHOR]

Published

2007

17. Variance analysis of unbiased complex-valued ℓp-norm minimizer

Author

Yuan Chen, Hing Cheung So, Ercan E. Kuruoglu, and Xiao Long Yang

Subjects

Gaussian, 02 engineering and technology, Student-t distribution, symbols.namesake, Minimum-variance unbiased estimator, Bias of an estimator, lp-norm estimation, Impulsive distributions, Statistics, 0202 electrical engineering, electronic engineering, information engineering, Electrical and Electronic Engineering, Mathematics, Complex-valued signals, Estimation theory, Generalised Gaussian distribution, Estimator, 020206 networking & telecommunications, Variance (accounting), One-way analysis of variance, Noise, Control and Systems Engineering, Signal Processing, Variance analysis, symbols, 020201 artificial intelligence & image processing, Computer Vision and Pattern Recognition, Alpha-stable distribution, Software

Abstract

Parameter estimation from noisy complex-valued measurements is a significant topic in various areas of science and engineering. In this aspect, an important goal is finding an unbiased estimator with minimum variance. Therefore, variance analysis of an estimator is desirable and of practical interest. In this paper, we concentrate on analyzing the complex-valued p-norm minimizer with p1. Variance formulas for the resultant nonlinear estimators in the presence of three representative bivariate noise distributions, namely, -stable, Student's t and mixture of generalized Gaussian models, are derived. To guarantee attaining the minimum variance for each noise process, optimum selection of p is studied, in the case of known noise statistics, such as probability density function and corresponding density parameters. All our results are confirmed by simulations and are compared with the Cramr-Rao lower bound. HighlightsVariance formulas for the complex-valued lp-norm minimizer with p1 are derived.Three representative bivariate non-Gaussian noise models are investigated.The optimum p is obtained by finding the root of a third-order polynomial..

Published

2017

18. Blind Signal Estimation in Conjugate Signal Models With Application to I/Q Imbalance Compensation.

Author

Valkama, Mikko, Renfors, Markku, and Koivunen, Visa

Subjects

SIGNALS & signaling, STATISTICS, ESTIMATION theory, COMMUNICATION, MICROWAVE receivers

Abstract

This letter addresses the blind signal estimation problem in the so-called conjugate signal model, where the observed signal is a linear combination of the desired signal and its complex conjugate. It will be shown that blind signal recovery in this kind of signal model is feasible using only the second-order statistics of the observed signal, under the assumption of circular or proper complex signals. Furthermore, one practical example application in the field of communications receiver signal processing will be given, where the image signal interference caused by amplitude and phase mismatches of the receiver analog branches is digitally attenuated. In addition to the analytical results and practical implementation algorithms, the efficiency of the proposed estimation concepts in the digital image rejection application is evaluated using computer simulations, showing impressive performance results. [ABSTRACT FROM AUTHOR]

Published

2005

19. On the autocorrelation and the triple correlation equation for complex-valued signals.

Author

Von Wolfersdorf, Lothar

Subjects

AUTOCORRELATION (Statistics), EQUATIONS, STATISTICAL correlation, FOURIER transforms, HOLOMORPHIC functions, FUNCTIONAL equations

Abstract

The paper deals with the autocorrelation equation on a finite interval and on the half-axis and with the triple correlation equation in the case of complex-valued signals. Via methods of Fourier transformation the equations are reduced to boundary value and continuation problems for holomorphic functions in the upper half-plane and to functional equations in two independent variables, respectively, and in this way solved in closed form. Thereby, on the one side, Cauchy integrals and Paley-Wiener conditions and, on the other side, the solution of a known functional equation in a single variable are applied. [ABSTRACT FROM AUTHOR]

Published

2004

20. Statistical inference for block sparsity of complex signals

Author

Wang, Jianfeng, Zhou, Zhiyong, Yu, Jun, Wang, Jianfeng, Zhou, Zhiyong, and Yu, Jun

Abstract

Block sparsity is an important parameter in many algorithms to successfully recover block sparse signals under the framework of compressive sensing. However, it is often unknown and needs to beestimated. Recently there emerges a few research work about how to estimate block sparsity of real-valued signals, while there is, to the best of our knowledge, no investigation that has been conductedfor complex-valued signals. In this paper, we propose a new method to estimate the block sparsity of complex-valued signal. Its statistical properties are obtained and verified by simulations. In addition,we demonstrate the importance of accurately estimating the block sparsity in signal recovery through asensitivity analysis.

Published

2019

21. Comparison of split complex-valued metaheuristic optimization algorithms for system identification problem [Sistem tanimlama problemi için bölünmüş kompleks-degerli sezgisel eniyileme algoritmalarinin karşilaştirilmasi]

Author

Menguc E.C., Peker M., Cinar S., 0-Belirlenecek, and Menguc, E.C., Elektrik-Elektronik Mühendisligi Bölümü, Nigde Ömer Halisdemir Üniversitesi, Nigde, Turkey -- Peker, M., Elektrik-Elektronik Mühendisligi Bölümü, Nigde Ömer Halisdemir Üniversitesi, Nigde, Turkey -- Cinar, S., Elektrik-Elektronik Mühendisligi Bölümü, Nigde Ömer Halisdemir Üniversitesi, Nigde, Turkey

Subjects

Complex-valued Signals, System Identification, Split Complex-valued Metaheuristic Algorithms

Abstract

Aselsan;et al.;Huawei;IEEE Signal Processing Society;IEEE Turkey Section;Netas, 26th IEEE Signal Processing and Communications Applications Conference, SIU 2018 -- 2 May 2018 through 5 May 2018 -- -- 137780, Since some of the real world problems include phase and amplitude information, complex modeling is more suitable. In this study, the well-used particle swarm optimization, simulated annealing and genetic algorithm are designed in a split form in order to process complex-valued signals. The performances of the algorithms are comparatively tested on two different system identification problems for different noise levels. Simulation results show that the split complex-valued metaheuristic algorithms produce results which are almost close to the weights of both unknown systems. © 2018 IEEE.

Published

2018

22. Bivariate Empirical Mode Decomposition

Author

Patrick Flandrin, P. Gonalves, Jonathan M. Lilly, Gabriel Rilling, Laboratoire de Physique de l'ENS Lyon (Phys-ENS), École normale supérieure de Lyon (ENS de Lyon)-Université Claude Bernard Lyon 1 (UCBL), Université de Lyon-Université de Lyon-Centre National de la Recherche Scientifique (CNRS), Laboratoire de l'Informatique du Parallélisme (LIP), Université de Lyon-Université de Lyon-Institut National de Recherche en Informatique et en Automatique (Inria)-Centre National de la Recherche Scientifique (CNRS), Earth and Space Research Institute [Seattle] (ESR), École normale supérieure - Lyon (ENS Lyon)-Centre National de la Recherche Scientifique (CNRS)-Université Claude Bernard Lyon 1 (UCBL), Université de Lyon-Université de Lyon, École normale supérieure - Lyon (ENS Lyon)-Université Claude Bernard Lyon 1 (UCBL), Flandrin, Patrick, and Gonçalves, Paulo

Subjects

Bivariate time series, Mathematical optimization, [INFO.INFO-TS] Computer Science [cs]/Signal and Image Processing, 02 engineering and technology, Bivariate analysis, Hilbert–Huang transform, [INFO.INFO-TS]Computer Science [cs]/Signal and Image Processing, 0202 electrical engineering, electronic engineering, information engineering, Applied mathematics, Electrical and Electronic Engineering, MATLAB, ComputingMilieux_MISCELLANEOUS, [SPI.SIGNAL] Engineering Sciences [physics]/Signal and Image processing, Mathematics, computer.programming_language, Signal processing, Complex-valued signals, Series (mathematics), Applied Mathematics, SIGNAL (programming language), 020206 networking & telecommunications, Extension (predicate logic), Nonlinear system, Signal Processing, Empirical Mode Decomposition, 020201 artificial intelligence & image processing, [SPI.SIGNAL]Engineering Sciences [physics]/Signal and Image processing, computer

Abstract

10 pages, 3 figures. Submitted to Signal Processing Letters, IEEE. Matlab/C codes and additional material are downloadable from http://perso.ens-lyon.fr/patrick.flandrin; The Empirical Mode Decomposition (EMD) has been introduced quite recently to adaptively decompose nonstationary and/or nonlinear time series. The method being initially limited to real-valued time series, we propose here an extension to bivariate (or complex-valued) time series which generalizes the rationale underlying the EMD to the bivariate framework. Where the EMD extracts zero-mean oscillating components, the proposed bivariate extension is designed to extract zero-mean rotating components. The method is illustrated on a real-world signal and properties of the output components are discussed. Free Matlab/C codes are available at http://perso.ens-lyon.fr/patrick.flandrin.

Published

2007

23. An Efficient Algorithm by Kurtosis Maximization in Reference-Based Framework

Author

Y. M. Wei, Z. G. Yuan, Y. F. Cao, P. C. Xu, W. Zhao, W. Jian, and Y. H. Shen

Subjects

business.industry, Computer science, Efficient algorithm, kurtosis, Kurtosis maximization, Pattern recognition, Blind signal separation, Independent component analysis, reference-based contrast functions, independent component analysis, Kurtosis, FastICA, Blind source separation, Artificial intelligence, Electrical and Electronic Engineering, complex-valued signals, business, fastICA

Abstract

This paper deals with the optimization of kurtosis for complex-valued signals in the independent component analysis (ICA) framework, where source signals are linearly and instantaneously mixed. Inspired by the recently proposed reference-based contrast schemes, a similar contrast function is put forward, based on which a new fast fixed-point (FastICA) algorithm is proposed. The new optimization method is similar in spirit to the former classical kurtosis-based FastICA algorithm but differs in the fact that it is much more efficient than the latter in terms of computational speed, which is significantly striking with large number of samples. The performance of this new algorithm is confirmed through computer simulations.

Published

2015

24. An Efficient Algorithm by Kurtosis Maximization in Reference-Based Framework

Author

Zhao, Wei, Wei, Yimin, Shen, Yuehong, Gao, Yufan, Yuan, Zhigang, Xu, Pengcheng, Jian, Wei, Zhao, Wei, Wei, Yimin, Shen, Yuehong, Gao, Yufan, Yuan, Zhigang, Xu, Pengcheng, and Jian, Wei

Abstract

This paper deals with the optimization of kurtosis for complex-valued signals in the independent component analysis (ICA) framework, where source signals are linearly and instantaneously mixed. Inspired by the recently proposed reference-based contrast schemes, a similar contrast function is put forward, based on which a new fast fixed-point (FastICA) algorithm is proposed. The new optimization method is similar in spirit to the former classical kurtosis-based FastICA algorithm but differs in the fact that it is much more efficient than the latter in terms of computational speed, which is significantly striking with large number of samples. The performance of this new algorithm is confirmed through computer simulations.

Published

2015

25. An Efficient Algorithm by Kurtosis Maximization in Reference-Based Framework

Abstract

This paper deals with the optimization of kurtosis for complex-valued signals in the independent component analysis (ICA) framework, where source signals are linearly and instantaneously mixed. Inspired by the recently proposed reference-based contrast schemes, a similar contrast function is put forward, based on which a new fast fixed-point (FastICA) algorithm is proposed. The new optimization method is similar in spirit to the former classical kurtosis-based FastICA algorithm but differs in the fact that it is much more efficient than the latter in terms of computational speed, which is significantly striking with large number of samples. The performance of this new algorithm is confirmed through computer simulations.

Published

2015

26. An Efficient Algorithm by Kurtosis Maximization in Reference-Based Framework

Abstract

This paper deals with the optimization of kurtosis for complex-valued signals in the independent component analysis (ICA) framework, where source signals are linearly and instantaneously mixed. Inspired by the recently proposed reference-based contrast schemes, a similar contrast function is put forward, based on which a new fast fixed-point (FastICA) algorithm is proposed. The new optimization method is similar in spirit to the former classical kurtosis-based FastICA algorithm but differs in the fact that it is much more efficient than the latter in terms of computational speed, which is significantly striking with large number of samples. The performance of this new algorithm is confirmed through computer simulations.

Published

2015

27. A Majorize-Minimize memory gradient method for complex-valued inverse problems

Author

Emilie Chouzenoux, Philippe Ciuciu, Jean-Christophe Pesquet, Anisia Florescu, Silviu Ciochina, University Politehnica of Bucharest [Romania] (UPB), Laboratoire d'Informatique Gaspard-Monge (LIGM), Université Paris-Est Marne-la-Vallée (UPEM)-École des Ponts ParisTech (ENPC)-ESIEE Paris-Fédération de Recherche Bézout-Centre National de la Recherche Scientifique (CNRS), Laboratoire de Neuroimagerie Assistée par Ordinateur (LNAO), Commissariat à l'énergie atomique et aux énergies alternatives (CEA), Part of A. Florescu's work was supported by PhD Fellowship 'Investitii in cercetareinovare- dezvoltare pentru viitor (DocInvest)', EC project POSDRU/107/1.5/S/76813., and Centre National de la Recherche Scientifique (CNRS)-Fédération de Recherche Bézout-ESIEE Paris-École des Ponts ParisTech (ENPC)-Université Paris-Est Marne-la-Vallée (UPEM)

Subjects

majorization-minimization, Mathematical optimization, sampling, Context (language use), Image processing, Iterative reconstruction, Operator (computer programming), [INFO.INFO-TS]Computer Science [cs]/Signal and Image Processing, Convergence (routing), magnetic resonance imaging, Electrical and Electronic Engineering, Mathematics, inverse problems, Inverse problem, image reconstruction, proximal methods, Linear map, Control and Systems Engineering, Signal Processing, descent methods, Computer Vision and Pattern Recognition, complex-valued signals, subspace algorithms, Gradient method, optimization, [SPI.SIGNAL]Engineering Sciences [physics]/Signal and Image processing, Software

Abstract

Complex-valued data are encountered in many application areas of signal and image processing. In the context of the optimization of functions of real variables, subspace algorithms have recently attracted much interest, owing to their efficiency for solving large-size problems while simultaneously offering theoretical convergence guarantees. The goal of this paper is to show how some of these methods can be successfully extended to the complex case. More precisely, we investigate the properties of the proposed complex-valued Majorize-Minimize Memory Gradient (3MG) algorithm. Important practical applications of these results arise in inverse problems. Here, we focus on image reconstruction in Parallel Magnetic Resonance Imaging (PMRI). The linear operator involved in the observation model then includes a subsampling operator over the k-space (2D Fourier domain) the choice of which is analyzed through our numerical results. In addition, sensitivity matrices associated with the multiple channel coils come into play. Comparisons with existing optimization methods confirm the better performance of the proposed algorithm. HighlightsAn extension of the Majorize-Minimize Memory Gradient algorithm for minimizing functions of complex variables is proposed.The convergence of the algorithm is proved under weak assumptions.A novel application of the algorithm to parallel Magnetic Resonance Imaging reconstruction is proposed.Through simulations on real data, the algorithm is shown to outperform recent optimization strategies in terms of convergence speed.The algorithm can handle various subsampling schemes, both convex and nonconvex penalization functions and different possibly redundant frame representations.

Published

2014

28. A complex-valued majorize-minimize memory gradient method with application to parallel MRI

Author

Chouzenoux, Emilie, Ciochina, Silviu, Ciuciu, Philippe, Florescu, Anisia, Pesquet, J.C., University Politehnica of Bucharest [Romania] (UPB), Laboratoire d'Informatique Gaspard-Monge (LIGM), Centre National de la Recherche Scientifique (CNRS)-Fédération de Recherche Bézout-ESIEE Paris-École des Ponts ParisTech (ENPC)-Université Paris-Est Marne-la-Vallée (UPEM), Modelling brain structure, function and variability based on high-field MRI data (PARIETAL), Inria Saclay - Ile de France, Institut National de Recherche en Informatique et en Automatique (Inria)-Institut National de Recherche en Informatique et en Automatique (Inria)-Service NEUROSPIN (NEUROSPIN), Direction de Recherche Fondamentale (CEA) (DRF (CEA)), Commissariat à l'énergie atomique et aux énergies alternatives (CEA)-Commissariat à l'énergie atomique et aux énergies alternatives (CEA)-Université Paris-Saclay-Direction de Recherche Fondamentale (CEA) (DRF (CEA)), Commissariat à l'énergie atomique et aux énergies alternatives (CEA)-Commissariat à l'énergie atomique et aux énergies alternatives (CEA)-Université Paris-Saclay, Part of this work was supported by PhD Fellowship 'Investitii in cercetare-inovare-dezvoltare pentru viitor (DocInvest)', EC project POSDRU/ 107/1.5/S/76813, Université Paris-Est Marne-la-Vallée (UPEM)-École des Ponts ParisTech (ENPC)-ESIEE Paris-Fédération de Recherche Bézout-Centre National de la Recherche Scientifique (CNRS), Service NEUROSPIN (NEUROSPIN), Université Paris-Saclay-Direction de Recherche Fondamentale (CEA) (DRF (CEA)), Commissariat à l'énergie atomique et aux énergies alternatives (CEA)-Commissariat à l'énergie atomique et aux énergies alternatives (CEA)-Inria Saclay - Ile de France, Institut National de Recherche en Informatique et en Automatique (Inria)-Institut National de Recherche en Informatique et en Automatique (Inria), and Chouzenoux, Emilie

Subjects

majorization-minimization, sampling, [INFO.INFO-TS] Computer Science [cs]/Signal and Image Processing, inverse problems, 020206 networking & telecommunications, 02 engineering and technology, image reconstruction, 030218 nuclear medicine & medical imaging, 03 medical and health sciences, 0302 clinical medicine, [INFO.INFO-TS]Computer Science [cs]/Signal and Image Processing, 0202 electrical engineering, electronic engineering, information engineering, magnetic resonance imaging, descent methods, complex-valued signals, subspace algorithms, optimization, [SPI.SIGNAL]Engineering Sciences [physics]/Signal and Image processing, [SPI.SIGNAL] Engineering Sciences [physics]/Signal and Image processing

Abstract

International audience; Complex-valued data are encountered in many application areas of signal and image processing. In the context of optimization of functions of real variables, subspace algorithms have recently attracted much interest, due to their efficiency in solving large-size problems while simultaneously offering theoretical convergence guarantees. The goal of this paper is to show how some of these methods can be successfully extended to the complex case. More precisely, we investigate the properties of the proposed complex-valued Majorize- Minimize Memory Gradient (3MG) algorithm. An important practical application of these results arises for image reconstruction in Parallel Magnetic Resonance Imaging (PMRI). Comparisons with existing optimization methods confirm the good performance of our approach for PMRI reconstruction.

Published

2013

29. Complex-valued signal processing for condition monitoring

Author

Pierre Granjon, Granjon, Pierre, GIPSA - Signal et Automatique pour le Diagnostic et la Surveillance (GIPSA-SA-IGA), Département Images et Signal (GIPSA-DIS), Grenoble Images Parole Signal Automatique (GIPSA-lab), Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Stendhal - Grenoble 3-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS)-Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Stendhal - Grenoble 3-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS)-Grenoble Images Parole Signal Automatique (GIPSA-lab), Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Stendhal - Grenoble 3-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS)-Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Stendhal - Grenoble 3-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS)-Département Automatique (GIPSA-DA), and Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Stendhal - Grenoble 3-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS)-Université Pierre Mendès France - Grenoble 2 (UPMF)-Université Stendhal - Grenoble 3-Université Joseph Fourier - Grenoble 1 (UJF)-Institut polytechnique de Grenoble - Grenoble Institute of Technology (Grenoble INP )-Centre National de la Recherche Scientifique (CNRS)

Subjects

[INFO.INFO-TS]Computer Science [cs]/Signal and Image Processing, [INFO.INFO-TS] Computer Science [cs]/Signal and Image Processing, pseudo correlation, pseudo spectrum, complex-valued signals, [SPI.SIGNAL]Engineering Sciences [physics]/Signal and Image processing, spectral analysis, Condition monitoring, [SPI.SIGNAL] Engineering Sciences [physics]/Signal and Image processing

Abstract

International audience; This paper concerns the analysis of stationary complex-valued signals, and its application to the condition monitoring field. More particularly, it is confirmed that usual tools such as correlation function or power spectrum are insufficient to entirely describe the statistical and geometrical properties of complex-valued signals. In that case, additional time and spectral domain quantities, namely the pseudo correlation function and the pseudo spectrum, have to be used. They lead to new important information, and allow to entirely describe second-order properties of complex-valued signals. Once these quantities theoretically defined, this paper describes their use in several condition monitoring problems, where 2 dimensional signals are considered as complex-valued signals. The results obtained in these examples show that these quantities contain crucial information for condition monitoring not given by usual quantities such as the power spectrum, especially in terms of fault localization.

Published

2008