Your search keyword '"Wavelet shrinkage"' showing total 38 results

1. Nonlinear wavelet shrinkage estimator of nonparametric regularity regression function via cross-validation with simulation study.

Author

Afshari, Mahmoud

Subjects

*NONLINEAR waves, *NONPARAMETRIC estimation, *REGRESSION analysis, *SIMULATION methods & models, *WAVELETS (Mathematics)

Abstract

Nonparametric regression techniques provide a very effective and simple way of finding structure in data sets without the imposition of a parametric regression model. Wavelet theory has the potential to provide statisticians with powerful new techniques for nonparametric inference. In this paper, we consider the wavelet shrinkage kernel estimator of regression function with a common one-dimensional probability density function. We investigate a new nonparametric curve estimator and convergence ratio of given estimator by using cross-validation method to choice of wavelet threshold when the observations are taken on the regular grid. At the end we used simulation study to examine our proposed estimator. We survey the theoretical outcomes with numerical computation by using software to compare purpose estimator with another estimators. [ABSTRACT FROM AUTHOR]

Published

2017

2. Semi-supervised Bayesian adaptive multiresolution shrinkage for wavelet-based denoising.

Author

Kong, Taewoon and Lee, Kichun

Subjects

*SIGNAL denoising, *WAVELETS (Mathematics), *BAYESIAN analysis, *SUPERVISED learning, *ESTIMATION theory, *MATHEMATICAL regularization, *REGRESSION analysis

Abstract

We can use wavelet shrinkage to estimate a possibly multivariate regression function g under the general regression setup, y = g + ε. We propose an enhanced wavelet-based denoising methodology based on Bayesian adaptive multiresolution shrinkage, an effective Bayesian shrinkage rule in addition to the semi-supervised learning mechanism. The Bayesian shrinkage rule is advanced by utilizing the semi-supervised learning method in which the neighboring structure of a wavelet coefficient is adopted and an appropriate decision function is derived. According to decision function, wavelet coefficients follow one of two prespecified Bayesian rules obtained using varying related parameters. The decision of a wavelet coefficient depends not only on its magnitude, but also on the neighboring structure on which the coefficient is located. We discuss the theoretical properties of the suggested method and provide recommended parameter settings. We show that the proposed method is often superior to several existing wavelet denoising methods through extensive experimentation. [ABSTRACT FROM AUTHOR]

Published

2017

3. Smoothed detrended fluctuation analysis.

Author

Romes Linhares, Raquel

Subjects

*WAVELETS (Mathematics), *RANDOM noise theory, *MONTE Carlo method, *TIME series analysis, *CHAOS theory

Abstract

The method of detrended fluctuation analysis (DFA) is useful in revealing the extent of long-range dependence, it has successfully been applied to different fields of interest. In this paper we proposed a smoothed detrended fluctuation analysis method based on the principle of wavelet shrinkage. The procedure is illustrated and compared with the DFA method by Monte Carlo simulations on fractional Gaussian noise models. [ABSTRACT FROM AUTHOR]

Published

2016

4. Image denoising based on iterative generalized cross-validation and fast translation invariant.

Author

Zhang, Libao, Chen, Jie, and Zhu, Tong

Subjects

*IMAGE denoising, *DIGITAL image processing, *WAVELETS (Mathematics), *MATHEMATICAL optimization, *WAVELET transforms, *ALGORITHMS

Abstract

Wavelet shrinkage is a promising method in image denoising, the key factor of which lies in the threshold selection. A fast and effective wavelet denoising method, called Iterative Generalized Cross-Validation and Fast Translation Invariant (IGCV–FTI) is proposed, which reduces the computation cost of the standard Generalized Cross-Validation (GCV) method and efficiently suppresses the Pseudo-Gibbs phenomena with an extra gain of 1–1.87 dB in PSNR compared with GCV. In the proposed approach, we establish a novel functional relation between the GCV results of two neighboring thresholds based on integer wavelet transform, and combine it with threshold-search interval optimization. As a result, the proposed IGCV reduces the time complexity of original GCV algorithm by two orders of magnitude. In addition, a recursion strategy is applied to expedite the translation invariant. The high efficiency and proficient capacity to remove noise make IGCV–FTI a good choice for image denoising. [ABSTRACT FROM AUTHOR]

Published

2015

5. Wavelet Shrinkage with Double Weibull Prior.

Author

Reményi, Norbert and Vidakovic, Brani

Subjects

*WAVELETS (Mathematics), *WEIBULL distribution, *DISTRIBUTION (Probability theory), *MATHEMATICAL models, *PARAMETER estimation, *MATHEMATICAL functions

Abstract

In this article, we propose a denoising methodology in the wavelet domain based on a Bayesian hierarchical model using Double Weibull prior. We propose two estimators, one based on posterior mean (Double Weibull Wavelet Shrinker, DWWS) and the other based on larger posterior mode (DWWS-LPM), and show how to calculate them efficiently. Traditionally, mixture priors have been used for modeling sparse wavelet coefficients. The interesting feature of this article is the use of non-mixture prior. We show that the methodology provides good denoising performance, comparable even to state-of-the-art methods that use mixture priors and empirical Bayes setting of hyperparameters, which is demonstrated by extensive simulations on standardly used test functions. An application to real-word dataset is also considered. [ABSTRACT FROM AUTHOR]

Published

2015

6. RELATIONS BETWEEN WAVELET SHRINKAGE AND NONLINEAR DIFFUSION IN IMAGE DENOISING.

Author

WU YADONG, CHEN YONGHUI, and SUN SHIXIN

Subjects

WAVELETS (Mathematics), BURGERS' equation, IMAGE denoising, WAVELET transforms, NONLINEAR difference equations, IMAGE processing, PARTIAL differential equations

Published

2005

7. Spectral subtraction denoising preprocessing block to improve P300-based brain-computer interfacing.

Author

Alhaddad, Mohammed J., Kamel, Mahmoud I., Makary, Meena M., Hargas, Hani, and Kadah, Yasser M.

Subjects

*SIGNAL denoising, *BRAIN-computer interfaces, *SIGNAL processing, *WAVELETS (Mathematics), *SUBTRACTION (Mathematics)

Abstract

Background The signals acquired in brain-computer interface (BCI) experiments usually involve several complicated sampling, artifact and noise conditions. This mandated the use of several strategies as preprocessing to allow the extraction of meaningful components of the measured signals to be passed along to further processing steps. In spite of the success present preprocessing methods have to improve the reliability of BCI, there is still room for further improvement to boost the performance even more. Method A new preprocessing method for denoising P300-based brain-computer interface data that allows better performance with lower number of channels and blocks is presented. The new denoising technique is based on a modified version of the spectral subtraction denoising and works on each temporal signal channel independently thus offering seamless integration with existing preprocessing and allowing low channel counts to be used. Results The new method is verified using experimental data and compared to the classification results of the same data without denoising and with denoising using present wavelet shrinkage based technique. Enhanced performance in different experiments as quantitatively assessed using classification block accuracy as well as bit rate estimates was confirmed. Conclusion The new preprocessing method based on spectral subtraction denoising offer superior performance to existing methods and has potential for practical utility as a new standard preprocessing block in BCI signal processing. [ABSTRACT FROM AUTHOR]

Published

2014

8. COMPARING THE BOX-JENKINS MODELS BEFORE AND AFTER THE WAVELET FILTERING IN TERMS OF REDUCING THE ORDERS WITH APPLICATION.

Author

MUSTAFA, QAIS and ALZUBAYDI, TAHA H. A.

Subjects

BOX-Jenkins forecasting, WAVELETS (Mathematics), ESTIMATION theory, TIME series analysis, FILTERS (Mathematics), PROBLEM solving, MATHEMATICAL models

Abstract

In this paper, the estimated linear models of Box-Jenkins has been compared from time series observations , before and after wavelet shrinkage filtering and then reducing the order of the estimated model from filtered observations (with preserving the accuracy and suitability of the estimated models) and re-compared with the estimated linear model of original observations, depending on some statistical criteria through taking a practical application of time series and using statistical programs such as Statgraphics, NCSS and MATLAB. The results of the paper showed the efficiency of wavelet shrinkage filters in solving the noise problem and obtaining the efficient estimated models , and specifically the wavelet shrinkage filter (dmey) with Soft threshold which estimated it's level using the Fixed Form method of filtered observations , and the possibility of obtaining linear models of the filterd observations with lower orders and higher efficiency compared with the corresponding estimated model of original observations [ABSTRACT FROM AUTHOR]

Published

2013

9. Full Bayesian wavelet inference with a nonparametric prior

Author

Wang, Xue and Walker, Stephen G.

Subjects

*BAYESIAN analysis, *WAVELETS (Mathematics), *MATHEMATICAL statistics, *NONPARAMETRIC estimation, *RANDOM noise theory, *MATHEMATICAL symmetry, *MATHEMATICAL functions

Abstract

Abstract: In this paper, we introduce a new Bayesian nonparametric model for estimating an unknown function in the presence of Gaussian noise. The proposed model involves a mixture of a point mass and an arbitrary (nonparametric) symmetric and unimodal distribution for modeling wavelet coefficients. Posterior simulation uses slice sampling ideas and the consistency under the proposed model is discussed. In particular, the method is shown to be computationally competitive with some of best Empirical wavelet estimation methods. [Copyright &y& Elsevier]

Published

2013

10. Image De-noising with a New Threshold Value Using Wavelets.

Author

Ismail, B. and Khan, Anjum

Subjects

*WAVELETS (Mathematics), *ELECTRONIC noise, *MATHEMATICAL decomposition, *GAUSSIAN distribution, *PARAMETER estimation, *DATA analysis

Abstract

The image de-noising is the process to remove the noise from the image naturally corrupted by the noise. The wavelet method is one among the various methods for recovering infinite dimensional objects like curves, densities, images etc. The wavelet techniques are very effective to remove the noise because of its ability to capture the energy of a signal in few energy transform values. The wavelet methods are based on shrinking the wavelet coefficients in the wavelet domain. This paper concentrates on selecting a threshold for wavelet function estimation. A new threshold value is pro-posed to shrink the wavelet coefficients obtained by wavelet decomposition of a noisy image by considering that the sub band coefficients have a gener-alized Gaussian distribution. The proposed threshold value is based on the power of 2 in the size 2J x 2J of the data that can be computed efficiently. The experiment has been conducted on various test images to compare with the established threshold parameters. The result shows that the proposed threshold value removes the noise significantly. [ABSTRACT FROM AUTHOR]

Published

2012

11. Denoising of Medical Images Using Dual Tree Complex Wavelet Transform.

Author

Raj, V. Naga Prudhvi and Venkateswarlu, T.

Subjects

DIAGNOSTIC imaging, WAVELETS (Mathematics), MATHEMATICAL transformations, IMAGE quality analysis, TREE graphs, EMBEDDINGS (Mathematics)

Abstract

Abstract: In Medical diagnosis operations such as feature extraction and object recognition will play the key role. These tasks will become difficult if the images are corrupted with noise. So the development of effective algorithms for noise removal became an important research area in present days. Developing Image denoising algorithms is a difficult task since fine details in a medical image embedding diagnostic information should not be destroyed during noise removal. Many of the wavelet based denoising algorithms use DWT (Discrete Wavelet Transform) in the decomposition stage are suffering from shift variance and lack of directionality. To overcome this in this paper we are proposing the denoising method which uses dual tree complex wavelet transform to decompose the image and shrinkage operation to eliminate the noise from the noisy image. In the shrinkage step we used semi-soft and stein thresholding operators along with traditional hard and soft thresholding operators and verified the suitability of dual tree complex wavelet transform for the denoising of medical images. The results proved that the denoised image using DTCWT (Dual Tree Complex Wavelet Transform) have a better balance between smoothness and accuracy than the DWT and less redundant than UDWT (Undecimated Wavelet Transform). We used the SSIM (Structural similarity index measure) along with PSNR (Peak signal to noise ratio) to assess the quality of denoised images. [Copyright &y& Elsevier]

Published

2012

12. Separation of EEG and ECG components based on wavelet shrinkage and variable cosine window.

Author

Sakai, M., Okuyama, Y., and Wei, D.

Subjects

*ELECTROENCEPHALOGRAPHY, *ELECTROCARDIOGRAPHY, *WAVELETS (Mathematics), *ALGORITHMS, *HEART beat

Abstract

During ambulatory monitoring, it is sometimes required to record an electroencephalogram (EEG) and an electrocardiogram (ECG) simultaneously. It would be ideal if both EEG and ECG could be obtained with one measurement. Here, we introduce an algorithm that combines the wavelet shrinkage and variable cosine window operation to separate the EEG and ECG components from an EEG signal recorded with a noncephalic reference (NCR). Evaluation using simulated data and actual measured data showed that accurate frequency analysis of EEG and an R-R detection-based heart rate analysis were feasible with our proposed algorithm, which improved the signal-averaging based algorithm so that ECG components containing ectopic beats can be applied. [ABSTRACT FROM AUTHOR]

Published

2012

13. An improved image denoising model based on the directed diffusion equation

Author

Sun, Xiaoli, Li, Min, and Zhang, Weiqiang

Subjects

*IMAGE processing, *SIGNAL processing, *HEAT equation, *OPERATOR theory, *WAVELETS (Mathematics), *COMPUTER vision

Abstract

Abstract: By substituting an anisotropic diffusion operator for the isotropic Laplace operator in the directed diffusion equation, adding two different coefficients in the two diffusion terms, and choosing the image denoised by soft wavelet shrinkage as the initial approximate image, an improved directed diffusion equation model is proposed. Experiments show that the new model can solve the problem that edges and details will be rapidly blurred during the diffusion process in the directed diffusion equation. [Copyright &y& Elsevier]

Published

2011

14. Investigating the enhancement of template-free activation detection of event-related fMRI data using wavelet shrinkage and figures of merit

Author

Ngan, Shing-Chung, Hu, Xiaoping, and Khong, Pek-Lan

Subjects

*EVOKED potentials (Electrophysiology), *MAGNETIC resonance imaging, *WAVELETS (Mathematics), *DATA, *RECEIVER operating characteristic curves, *ROOT-mean-squares

Abstract

Abstract: Objective: We propose a method for preprocessing event-related functional magnetic resonance imaging (fMRI) data that can lead to enhancement of template-free activation detection. The method is based on using a figure of merit to guide the wavelet shrinkage of a given fMRI data set. Background: Several previous studies have demonstrated that in the root-mean-square error setting, wavelet shrinkage can improve the signal-to-noise ratio of fMRI time courses. However, preprocessing fMRI data in the root-mean-square error setting does not necessarily lead to enhancement of template-free activation detection. Motivated by this observation, in this paper, we move to the detection setting and investigate the possibility of using wavelet shrinkage to enhance template-free activation detection of fMRI data. Methodology: The main ingredients of our method are (i) forward wavelet transform of the voxel time courses, (ii) shrinking the resulting wavelet coefficients as directed by an appropriate figure of merit, (iii) inverse wavelet transform of the shrunk data, and (iv) submitting these preprocessed time courses to a given activation detection algorithm. Two figures of merit are developed in the paper, and two other figures of merit adapted from the literature are described. Results: Receiver-operating characteristic analyses with simulated fMRI data showed quantitative evidence that data preprocessing as guided by the figures of merit developed in the paper can yield improved detectability of the template-free measures. We also demonstrate the application of our methodology on an experimental fMRI data set. Conclusions: The proposed method is useful for enhancing template-free activation detection in event-related fMRI data. It is of significant interest to extend the present framework to produce comprehensive, adaptive and fully automated preprocessing of fMRI data optimally suited for subsequent data analysis steps. [Copyright &y& Elsevier]

Published

2011

15. Denoising of Hyperspectral Imagery Using Principal Component Analysis and Wavelet Shrinkage.

Author

Chen, Guangyi and Qian, Shen-En

Subjects

*DIGITAL image processing, *SPECTRUM analysis, *PRINCIPAL components analysis, *WAVELETS (Mathematics), *MATHEMATICAL transformations, *SIGNAL-to-noise ratio, *PIXELS, *SIGNAL processing

Abstract

In this paper, a new denoising method is proposed for hyperspectral data cubes that already have a reasonably good signal-to-noise ratio (SNR) (such as 600 : 1). Given this level of the SNR, the noise level of the data cubes is relatively low. The conventional image denoising methods are likely to remove the fine features of the data cubes during the denoising process. We propose to decorrelate the image information of hyperspectral data cubes from the noise by using principal component analysis (PCA) and removing the noise in the low-energy PCA output channels. The first PCA output channels contain a majority of the total energy of a data cube, and the rest PCA output channels contain a small amount of energy. It is believed that the low-energy channels also contain a large amount of noise. Removing noise in the low-energy PCA output channels will not harm the fine features of the data cubes. A 2-D bivariate wavelet thresholding method is used to remove the noise for low-energy PCA channels, and a 1-D dual-tree complex wavelet transform denoising method is used to remove the noise of the spectrum of each pixel of the data cube. Experimental results demonstrated that the proposed denoising method produces better denoising results than other denoising methods published in the literature. [ABSTRACT FROM AUTHOR]

Published

2011

16. Heuristic wavelet shrinkage for denoising.

Author

Liu, Chan-Cheng, Sun, Tsung-Ying, Tsai, Shang-Jeng, Yu, Yu-Hsiang, and Hsieh, Sheng-Ta

Subjects

NOISE control, WAVELETS (Mathematics), PARTICLE swarm optimization, HEURISTIC programming, ALGORITHMS, COMPARATIVE studies

Abstract

Abstract: Noise reduction without any prior knowledge of noise or signals is addressed in this study. Compared with conventional filters, wavelet shrinkage can respect this requirement to reduce noise from received signal in wavelet coefficients. However, wavelet threshold depends on an estimate of noise deviation and a weight relating signal''s length cannot be applied in every case. This paper uses particle swarm optimization (PSO) to explore a suitable threshold in a complete solution space, named PSOShrink. A general-purpose objective function which is derived from blind signal separation (BSS) theory is further proposed. In simulation, four benchmarks signals and three degrading degrees are testing; meanwhile, three existing algorithm with state-of-the-art are performed for comparison. PSOShrink can not only recovers source signals from a heavy blurred signal but also remains details of a source signal from a light blurred signal; moreover, it performs outstanding denoising in every simulation case. [Copyright &y& Elsevier]

Published

2011

17. Multilevel adaptive thresholding and shrinkage technique for denoising using Daubechies complex wavelet transform.

Author

Khare, A, Tiwary, U S, Pedrycz, W, and Jeon, Moongu

Subjects

*WAVELETS (Mathematics), *DIGITAL image processing, *ADAPTIVE control systems, *APPROXIMATION theory, *DIMENSIONAL analysis, *STATISTICAL correlation, *ANALYSIS of variance

Abstract

In this paper, we have proposed a multilevel soft thresholding technique for noise removal in Daubechies complex wavelet transform domain. Two useful properties of Daubechies complex wavelet transform, approximate shift invariance and strong edge representation, have been explored. Most of the uncorrelated noise gets removed by shrinking complex wavelet coefficients at the lowest level, while correlated noise gets removed by only a fraction at lower levels, so we used multilevel thresholding and shrinkage on complex wavelet coefficients. The proposed method firstly detects strong edges using imaginary components of complex coefficients and then applies multilevel thresholding and shrinkage on complex wavelet coefficients in the wavelet domain at non-edge points. The proposed threshold depends on the variance of wavelet coefficients, the mean and the median of absolute wavelet coefficients at a particular level. Dependence of these parameters makes this method adaptive in nature. Results obtained for one-dimensional signals and two-dimensional images demonstrate an improved denoising performance over other related methods available in the literature. [ABSTRACT FROM AUTHOR]

Published

2010

18. Nonlinear Filtering in ECG Signal Denoising.

Author

GERMÁN-SALLÓ, Zoltán

Subjects

*ELECTROCARDIOGRAPHY, *TIME-frequency analysis, *RANDOM noise theory, *WAVELETS (Mathematics), *SIGNAL processing

Abstract

This paper presents a non-linear filtering method based on the multiresolution analysis of the Discrete Wavelet Transform (DWT). The main idea is to use the time-frequency localization properties of the wavelet decomposition. The proposed algorithm is using an extra decomposition of the identified noise in order to reduce the correlation between the electrocardiogram (ECG) signal and noise. The linear denoising approach assumes that the noise can be found within certain scales, for example, at the finest scales when the coarsest scales are assumed to be noise-free. The non-linear thresholding approach involves discarding the details exceeding a certain limit. This approach assumes that every wavelet coefficient contains noise which is distributed over all scales. The non-linear filter thresholds the wavelet coefficients and subtracts the correlated noise. The used threshold depends on the noise level in each of the frequency bands associated to the wavelet decomposition. The proposed non-linear filter acts by thresholding the detail coefficients in a particular way, in order to eliminate the correlation between the noise and the signal. In this paper, in order to evaluate the proposed filtering method, signals from the MIT-BIH database have been used, and the filtering procedure was performed with added Gaussian noise. The proposed procedure was compared with ordinary wavelet transform and wavelet packet transform based denoising procedures, the followed parameters are the signal to noise ratio and the denoising error. [ABSTRACT FROM AUTHOR]

Published

2010

19. Despeckling of medical ultrasound images using Daubechies complex wavelet transform

Author

Khare, Ashish, Khare, Manish, Jeong, Yongyeon, Kim, Hongkook, and Jeon, Moongu

Subjects

*IMAGE processing, *MEDICAL imaging systems, *DIAGNOSTIC ultrasonic imaging, *DIFFRACTION patterns, *SPECKLE interference, *WAVELETS (Mathematics), *SIGNAL-to-noise ratio

Abstract

Abstract: The paper presents a novel despeckling method, based on Daubechies complex wavelet transform, for medical ultrasound images. Daubechies complex wavelet transform is used due to its approximate shift invariance property and extra information in imaginary plane of complex wavelet domain when compared to real wavelet domain. A wavelet shrinkage factor has been derived to estimate the noise-free wavelet coefficients. The proposed method firstly detects strong edges using imaginary component of complex scaling coefficients and then applies shrinkage on magnitude of complex wavelet coefficients in the wavelet domain at non-edge points. The proposed shrinkage depends on the statistical parameters of complex wavelet coefficients of noisy image which makes it adaptive in nature. Effectiveness of the proposed method is compared on the basis of signal to mean square error (SMSE) and signal to noise ratio (SNR). The experimental results demonstrate that the proposed method outperforms other conventional despeckling methods as well as wavelet based log transformed and non-log transformed methods on test images. Application of the proposed method on real diagnostic ultrasound images has shown a clear improvement over other methods. [Copyright &y& Elsevier]

Published

2010

20. Aggressive Data Reduction for Damage Detection in Structural Health Monitoring.

Author

Park, Chiwoo, Jiong Tang, and Yu Ding

Subjects

STRUCTURAL health monitoring, DATA reduction, WAVELETS (Mathematics), DETECTORS, AUTOMATIC data collection systems

Abstract

While wireless sensors are increasingly adopted in various applications, the need of developing data reduction methods to alleviate data transmission rate issue between the sensors and the data interpretation unit becomes more urgent. This article presents a new data reduction method for sensors used in structural health monitoring application. Our goal is to achieve an effective data reduction capability while maintaining adequate power for damage detection. We propose to establish an explicit measure of damage detection capability for the features in the response signals and use this measure to select the subset of the features that balance between the degree of data reduction and the damage detection capability. We also explore a computationally efficient procedure searching for the best subset of the features. This new method is tested on experimentally obtained Lamb wave signals for beam damage detection. Performance comparisons with respect to the existing methods demonstrate the strength of the proposed method. [ABSTRACT FROM AUTHOR]

Published

2010

21. A comparative study on several algorithms for denoising of thin layer densitograms

Author

Komsta, Łukasz

Subjects

*DIGITAL filters (Mathematics), *ALGORITHMS, *DENSITOMETRY, *WAVELETS (Mathematics), *NOISE control, *CHEMOMETRICS, *THIN layer chromatography, *COMPARATIVE studies, *EQUIPMENT & supplies

Abstract

Abstract: This paper compares classical filtering techniques (Savitzky–Golay, Adaptive Degree Polynomial Filter, Fourier denoising, Butterworth and Chebyshev IIR filters) and the wavelet shrinkage (31 mother wavelets, 3 thresholding techniques and 11 decomposition levels). These techniques were compared with the original noisy signal and the reference signal, denoised experimentally by the averaging of 64 measurements. The best similarity to reference signal was observed in the case of filters, but they slightly oversmoothed the signal. The wavelet shrinkage gave less denoised signals. The significant influence of the thresholding technique and decomposition level was observed (the best conditions—the level 2 or 3 and soft thresholding). Changing of the mother wavelet almost does not change the result, which is similar to the earlier literature findings. The presented results can be used as general recommendations for denoising of the densitometric fingerprints before applying further chemometric algorithms. The best choices are: Savitzky–Golay filter of appropriate (optimized against the autocorrelation) window width or wavelet shrinkage with Haar wavelet, soft thresholding and high decomposition level. [Copyright &y& Elsevier]

Published

2009

22. IMAGE DENOISING BASED ON WAVELET SHRINKAGE USING NEIGHBOR AND LEVEL DEPENDENCY.

Author

CHO, DONGWOOK, BUI, TIEN D., and CHEN, GUANGYI

Subjects

*WAVELETS (Mathematics), *NOISE control, *RISK assessment, *ESTIMATION theory, *IMAGE analysis, *SIGNAL-to-noise ratio

Abstract

Since Donoho et al. proposed the wavelet thresholding method for signal denoising, many different denoising approaches have been suggested. In this paper, we present three different wavelet shrinkage methods, namely NeighShrink, NeighSure and NeighLevel. NeighShrink thresholds the wavelet coefficients based on Donoho's universal threshold and the sum of the squares of all the wavelet coefficients within a neighborhood window. NeighSure adopts Stein's unbiased risk estimator (SURE) instead of the universal threshold of NeighShrink so as to obtain the optimal threshold with minimum risk for each subband. NeighLevel uses parent coefficients in a coarser level as well as neighbors in the same subband. We also apply a multiplying factor for the optimal universal threshold in order to get better denoising results. We found that the value of the constant is about the same for different kinds and sizes of images. Experimental results show that our methods give comparatively higher peak signal to noise ratio (PSNR), are much more efficient and have less visual artifacts compared to other methods. [ABSTRACT FROM AUTHOR]

Published

2009

23. Multiscale methods for data on graphs and irregular multidimensional situations.

Author

Jansen, Maarten, Nason, Guy P., and Silverman, B. W.

Subjects

WAVELETS (Mathematics), GRAPH theory, MATHEMATICAL statistics, GRAPHIC methods, REGRESSION analysis, MATHEMATICAL analysis

Abstract

For regularly spaced one-dimensional data, wavelet shrinkage has proven to be a compelling method for non-parametric function estimation. We create three new multiscale methods that provide wavelet-like transforms both for data arising on graphs and for irregularly spaced spatial data in more than one dimension. The concept of scale still exists within these transforms, but as a continuous quantity rather than dyadic levels. Further, we adapt recent empirical Bayesian shrinkage techniques to enable us to perform multiscale shrinkage for function estimation both on graphs and for irregular spatial data. We demonstrate that our methods perform very well when compared with several other methods for spatial regression for both real and simulated data. Although we concentrate on multiscale shrinkage (regression) we present our new ‘wavelet transforms’ as generic tools intended to be the basis of methods that might benefit from a multiscale representation of data either on graphs or for irregular spatial data. [ABSTRACT FROM AUTHOR]

Published

2009

24. A fast wavelet approach for recovering damaged images.

Author

Kim, Donghoh, Lee, Youngjo, and Oh, Hee-Seok

Subjects

*IMAGE reconstruction, *WAVELETS (Mathematics), *STATISTICAL matching, *ALGORITHMS, *SIMULATION methods & models

Abstract

A wavelet method is proposed for recovering damaged images. The proposed method combines wavelet shrinkage with preprocessing based on a binning process and an imputation procedure that is designed to extend the scope of wavelet shrinkage to data with missing values and perturbed locations. The proposed algorithm, termed as the BTW algorithm is simple to implement and efficient for recovering an image. Furthermore, this algorithm can be easily applied to wavelet regression for one-dimensional (1-D) signal estimation with irregularly spaced data. Simulation studies and real examples show that the proposed method can produce substantially effective results. [ABSTRACT FROM AUTHOR]

Published

2008

25. Wavelet iterative regularization for image restoration with varying scale parameter

Author

Hao, Bin-bin, Li, Min, and Feng, Xiang-chu

Subjects

*WAVELETS (Mathematics), *IMAGE reconstruction, *IMAGE, *ITERATIVE methods (Mathematics)

Abstract

Abstract: We first generalize the wavelet-based iterative regularization method and the wavelet-based inverse scale space to shift invariant wavelet-based cases for image restoration. Then, a method to estimate the scale parameter is proposed from wavelet-based iterative regularization; different parameters with different iterations are obtained. The wavelet-based iterative regularization with the new parameter, which controls the extent of denoising more precisely in the wavelet domain, leads to iterative global wavelet shrinkage. We also obtain a time adaptive wavelet-based inverse scale space from the iterative procedure with the proposed parameter. We provide a proof of the convergence and obtain a stopping criterion for the iterative procedure with the new scale parameter based on wavelet transform. The proposed iterative regularized method obtains quite accurate results on a variety of images. Numerical experiments show that the proposed methods can efficiently remove noise and well preserve the details of images. [Copyright &y& Elsevier]

Published

2008

26. From two-dimensional nonlinear diffusion to coupled Haar wavelet shrinkage

Author

Mrázek, Pavel and Weickert, Joachim

Subjects

*WAVELETS (Mathematics), *SCHEMES (Algebraic geometry), *HARMONIC analysis (Mathematics), *MATHEMATICS

Abstract

Abstract: This paper studies the connections between discrete two-dimensional schemes for shift-invariant Haar wavelet shrinkage on one hand, and nonlinear diffusion on the other. We show that using a single iteration on a single scale, the two methods can be made equivalent by the choice of the nonlinearity which controls each method: the shrinkage function, or the diffusivity function, respectively. In the two-dimensional setting, this diffusion–wavelet connection shows an important novelty compared to the one-dimensional framework or compared to classical 2-D wavelet shrinkage: The structure of two-dimensional diffusion filters suggests to use a coupled, synchronised shrinkage of the individual wavelet coefficient channels. This coupling enables to design Haar wavelet filters with good rotation invariance at a low computational cost. Furthermore, by transferring the channel coupling of vector- and matrix-valued nonlinear diffusion filters to the Haar wavelet setting, we obtain well-synchronised shrinkage methods for colour and tensor images. Our experiments show that these filters perform significantly better than conventional shrinkage methods that process all wavelets independently. [Copyright &y& Elsevier]

Published

2007

27. Solving variational problems in image processing via projections – a common view on TV denoising and wavelet shrinkage.

Author

Lorenz, Dirk A.

Subjects

WAVELETS (Mathematics), TELEVISION, BREAKAGE, shrinkage, etc. (Commerce), HARMONIC analysis (Mathematics), TELECOMMUNICATION satellites

Abstract

In this paper we investigate a special class of minimization problems for image denoising and deblurring. We focus on problems with positively one homogeneous penalty terms and show that the minimizer can be given in terms of projections. Especially we apply the results to wavelet shrinkage and TV denoising. Furthermore we present an application to deblurring with a TV penalty term. The approach presented here provides a common view on TV denoising and wavelet shrinkage. [ABSTRACT FROM AUTHOR]

Published

2007

28. Iterative Regularization and Nonlinear Inverse Scale Space Applied to Wavelet-Based Denoising.

Author

Jinjun Xu and Osher, Stanley

Subjects

*WAVELETS (Mathematics), *IMAGE reconstruction, *NOISE, *IMAGE processing, *NONLINEAR statistical models, *MATHEMATICAL analysis

Abstract

In this paper, we generalize the iterative regularization method and the inverse scale space method, recently developed for total-variation (TV) based image restoration, to wavelet-based image restoration. This continues our earlier joint work with others where we applied these techniques to variational-based image restoration, obtaining significant improvement over the Rudin-Osher-Fatemi TV-based restoration. Here, we apply these techniques to soft shrinkage and obtain the somewhat surprising result that a) the iterative procedure applied to soft shrinkage gives firm shrinkage and converges to hard shrinkage and b) that these procedures enhance the noise-removal capability both theoretically, in the sense of generalized Bregman distance, and for some examples, experimentally, in terms of the signal-to-noise ratio, leaving less signal in the residual. [ABSTRACT FROM AUTHOR]

Published

2007

29. TRANSLATION INVARIANT RI-SPLINE WAVELET AND ITS APPLICATION ON DE-NOISING.

Author

ZHANG, ZHONG, TODA, HIROSHI, FUJIWARA, HISANAGA, and REN, FUJI

Subjects

WAVELETS (Mathematics), INVARIANT wave equations, ALGORITHMS, ELECTROCARDIOGRAPHY, NOISE, INVARIANTS (Mathematics)

Abstract

Wavelet Shrinkage using DWT has been widely used in de-noising although DWT has a translation variance problem. In this study, we solve this problem by using the translation invariant DWT. For this purpose, we propose a new complex wavelet, the Real-Imaginary Spline Wavelet (RI-Spline wavelet). We also propose the Coherent Dual-Tree algorithm for the RI-Spline wavelet and extend it to the 2-Dimensional. Then we apply this translation invariant RI-Spline wavelet for translation invariant de-noising. Experimental results show that our method, when applied to ECG data, the medical image and the textile surface inspection can obtain better de-noising results than that of conventional Wavelet Shrinkage. [ABSTRACT FROM AUTHOR]

Published

2006

30. A MULTISCALE WAVELET-INSPIRED SCHEME FOR NONLINEAR DIFFUSION.

Author

PLONKA, GERLIND and STEIDL, GABRIELE

Subjects

*WAVELETS (Mathematics), *HARMONIC analysis (Mathematics), *BURGERS' equation, *NONLINEAR difference equations, *IMAGE analysis

Abstract

Nonlinear diffusion filtering and wavelet shrinkage are two successfully applied methods for discontinuity preserving denoising of signals and images. Recently, relations between both methods have been established taking into account wavelet shrinkage at one scale. In this paper, we propose a new explicit scheme for nonlinear diffusion which directly incorporates ideas from multiscale Haar wavelet shrinkage. We prove that our scheme permits larger time steps while preserving convergence to the mean signal value. Numerical examples demonstrate the behavior of our scheme for two and three scales. [ABSTRACT FROM AUTHOR]

Published

2006

31. Diffusion-Inspired Shrinkage Functions and Stability Results for Wavelet Denoising.

Author

Mrázek, Pavel, Weickert, Joachim, and Steidl, Gabriele

Subjects

*BURGERS' equation, *HAAR integral, *WAVELETS (Mathematics), *HARMONIC analysis (Mathematics), *INVARIANTS (Mathematics), *MATHEMATICS

Abstract

We study the connections between discrete one-dimensional schemes for nonlinear diffusion and shift-invariant Haar wavelet shrinkage. We show that one step of a (stabilised) explicit discretisation of nonlinear diffusion can be expressed in terms of wavelet shrinkage on a single spatial level. This equivalence allows a fruitful exchange of ideas between the two fields. In this paper we derive new wavelet shrinkage functions from existing diffusivity functions, and identify some previously used shrinkage functions as corresponding to well known diffusivities. We demonstrate experimentally that some of the diffusion-inspired shrinkage functions are among the best for translation-invariant multiscale wavelet denoising. Moreover, by transferring stability notions from diffusion filtering to wavelet shrinkage, we derive conditions on the shrinkage function that ensure that shift invariant single-level Haar wavelet shrinkage is maximum–minimum stable, monotonicity preserving, and variation diminishing. [ABSTRACT FROM AUTHOR]

Published

2005

32. Wavelet-based inverse halftoning for error diffused halftones

Author

Djebbouri, M., Djebouri, D., and Naoum, R.

Subjects

*HALFTONE process, *MATHEMATICAL functions, *ALGORITHMS, *WAVELETS (Mathematics)

Abstract

Abstract: This paper describes a technique for inverse halftoning based on the wavelet domain deconvolution that comprises Fourier-domain followed by wavelet-domain noise suppression, in order to benefit from the advantages of each of them. The proposed algorithm can be formulated as a linear deconvolution problem. In fact, we model such a gray-scale image to be the result of a convolution of the original image with a point spread function (PSF) and a colored noise. Our method performs inverse halftoning by first inverting the model specified convolution operator and then attenuating the residual noise using scalar wavelet-domain shrinkage. Using simulations, we verify that the proposed method is competitive with state-of-the-art inverse halftoning techniques in the mean-square-sense and that has also good visual performance. We illustrate the results with simulations on some examples. [Copyright &y& Elsevier]

Published

2005

33. Real nonparametric regression using complex wavelets.

Author

Barber, Stuart and Nason, Guy P.

Subjects

WAVELETS (Mathematics), NONPARAMETRIC statistics, GAUSSIAN distribution, ALGEBRAIC curves, FRACTIONAL parentage coefficients

Abstract

Wavelet shrinkage is an effective nonparametric regression technique, especially when the underlying curve has irregular features such as spikes or discontinuities. The basic idea is simple: take the discrete wavelet transform of data consisting of a signal corrupted by noise; shrink or remove the wavelet coefficients to remove the noise; then invert the discrete wavelet transform to form an estimate of the true underlying curve. Various researchers have proposed increasingly sophisticated methods of doing this by using real-valued wavelets. Complex-valued wavelets exist but are rarely used. We propose two new complex-valued wavelet shrinkage techniques: one based on multiwavelet style shrinkage and the other using Bayesian methods. Extensive simulations show that our methods almost always give significantly more accurate estimates than methods based on real-valued wavelets. Further, our multiwavelet style shrinkage method is both simpler and dramatically faster than its competitors. To understand the excellent performance of this method we present a new risk bound on its hard thresholded coefficients. [ABSTRACT FROM AUTHOR]

Published

2004

34. Adaptive image denoising and edge enhancement in scale-space using the wavelet transform

Author

Rosito Jung, Cláudio and Scharcanski, Jacob

Subjects

*DECOMPOSITION method, *WAVELETS (Mathematics)

Abstract

This paper proposes a new method for image denoising with edge preservation and enhancement, based on image multi-resolution decomposition by a redundant wavelet transform. At each resolution, the coefficients associated with noise and the coefficients associated with edges are modeled by Gaussians, and a shrinkage function is assembled. The shrinkage functions are combined in consecutive resolutions, and geometric constraints are applied to preserve edges that are not isolated. Within the proposed framework, edge related coefficients may be enhanced and denoised simultaneously. Finally, the inverse wavelet transform is applied to the modified coefficients. This method is adaptive, and performs well for images contaminated by natural and artificial noise. [Copyright &y& Elsevier]

Published

2003

35. Wavelet shrinkage data processing for neural networks in bioprocess modeling

Author

Chen, Bing H. and Woodley, John M.

Subjects

*ARTIFICIAL neural networks, *BIOLOGICAL systems, *WAVELETS (Mathematics)

Abstract

The modeling of biological systems has now become an essential prerequisite for effective bioprocess design, optimization and analysis. The difficulties present in using conventional techniques to model such a complex system make the application of artificial neural networks (ANNs) to these problems particularly attractive because of their capability for nonlinear mapping and lack of necessity for detailed mechanistic knowledge. However, building a reliable ANN model requires sufficient training data, which may be difficult when data are collected from litre-scale experiments. In this work, a bioconversion (with only limited experimental data) was firstly modeled by a radial basis function (RBF) neural network. Although the model provided a very low variance between experiment and simulation, it tended to result in oscillatory behaviour, which clearly does not reflect the accurate profile of the reaction. In order to overcome this drawback, wavelet shrinkage with biorthogonal filters was used to generate a reconstructed function using the RBF model as a base. The synthesis of N-acetyl-d-neuraminic acid by the enzymatic condensation of pyruvate with N-acetyl-d-mannosamine was used as a case study to show the effectiveness of the approach. The effects of alternative filters and border distortion are also discussed. [Copyright &y& Elsevier]

Published

2002

36. Semi-supervised wavelet shrinkage

Author

Lee, Kichun and Vidakovic, Brani

Subjects

*SUPERVISED learning, *WAVELETS (Mathematics), *MULTIVARIATE analysis, *REGRESSION analysis, *NONPARAMETRIC statistics, *MATHEMATICAL transformations, *MANIFOLDS (Mathematics), *SIMULATION methods & models

Abstract

Abstract: To estimate a possibly multivariate regression function under the general regression setup, , one can use wavelet thresholding as an alternative to conventional nonparametric regression methods. Wavelet thresholding is a simple operation in the wavelet domain that selects a subset of coefficients corresponding to an estimator of when back-transformed. We propose an enhancement to wavelet thresholding by selecting a subset in a semi-supervised fashion in which the neighboring structure and classification function appropriate for wavelet domains are utilized. Wavelet coefficients are classified into two types: labeled, which have either strong or weak magnitudes, and unlabeled, which have in-between magnitudes. Both are connected to neighboring coefficients and belong to a low-dimensional manifold within the set of all wavelet coefficients. The decision to include a coefficient in the model depends not only on its magnitude but also on the labeled and the unlabeled coefficients from its neighborhood. We discuss the theoretical properties of the method and demonstrate its performance in simulated examples. [Copyright &y& Elsevier]

Published

2012

37. Wavelet estimation of a base-line signal from repeated noisy measurements by vertical block shrinkage

Author

Chang, Woojin and Vidakovic, Brani

Subjects

*WAVELETS (Mathematics), *ESTIMATION theory

Abstract

In this paper a new wavelet shrinkage technique is proposed and investigated. When data consist of a multiplicity of related noisy signals, we propose a wavelet-based shrinkage estimation procedure to summarize all data components into a single regularized and representative signal (“base-line”). This fusion of information from different runs is done via Stein-type shrinkage rule resulting from an empirical Bayes argument. The proposed shrinkage estimators maximize the predictive density under appropriate model assumptions on the wavelet coefficients. Features of this model-induced shrinkage are that it is “block-vertical” and local in time.The method, called VERTISHRINK, is evaluated on a battery of test signals under various signal-to-noise ratios and various number of vector components. An application in estimating the base-line signal in an experiment in tumor physiology is provided as well. [Copyright &y& Elsevier]

Published

2002

38. Scale dependent wavelet selection for de-noising of partial discharge detection.

Author

Li, Jian, Jiang, Tianyan, Grzybowski, Stanislaw, and Cheng, Changkui

Subjects

*ELECTRIC discharges, *MATHEMATICAL models, *APPROXIMATION theory, *WAVELETS (Mathematics), *STATISTICAL correlation, *ELECTRIC distortion, *WHITE noise theory, *SIGNAL processing, *ERROR analysis in mathematics

Abstract

Wavelet shrinkage methods are effective for de-noising of partial discharge (PD) detection. Base wavelets are related to distortion of PD signals de-noised by wavelet shrinkage methods. This paper presents a scale dependent wavelet selection scheme for de-noising of PD detection. The scale dependent wavelet selection scheme is called the energy based wavelet selection (EBWS) because an energy criterion is proposed for the scheme. In the proposed energy criterion, a base wavelet is selected as an optimal base wavelet if it can generate an approximation with the largest energy among all base wavelets for selection at each scale. PD high-frequency signals are simulated and PD ultra-high-frequency signals are obtained by experiments in laboratory for de-noising experiments and analysis. In comparison with the correlation-based wavelet selection (CBWS) scheme, the wavelet shrinkage, based on the EBWS, generates significantly smaller waveform distortion and magnitude errors of de-noised PD signals. [ABSTRACT FROM AUTHOR]

Published

2010