Article: Denoising 1D signal using wavelets Journal: International Journal of Intelligent Systems Technologies and Applications (IJISTA) 2020 Vol.19 No.6 pp.517 - 525 Abstract: Signal denoising is one of the most important areas in signal processing. In the present paper, we have denoised a 1D piecewise constant (PWC) signal corrupted by additive white Gaussian noise (AWGN) using the thresholded Haar wavelet denoising method. The central idea of the wavelet transform is the multiresolution decomposition of signals. This becomes advantageous because small objects require high resolution and low resolution is suitable for large objects. In multiresolution decomposition, an approximation component is created using a scaling function, which is often termed as a lowpass filter. Detail components are obtained using wavelet functions, which are often known as highpass filters. A series of approximations of a signal is thus obtained, which has difference in resolution among them by a factor 2. Detail components contain the difference between adjacent approximations. Proper thresholding of the transformed signal results in reduced noise because, in general, the noise component of a signal has a relatively smaller magnitude and wider bandwidth. We show that our method outperforms recently reported non-convex regularisation-based convex 1D total variation denoising method on PWC signals. Inderscience Publishers - linking academia, business and industry through research

Title: Denoising 1D signal using wavelets

Authors: Prateep Upadhay; S.K. Upadhyay; K.K. Shukla

Addresses: DST-CIMS Banaras Hindu University, Varanasi, Uttar Pradesh, 221005, India ' Department of Mathematical Sciences IIT (BHU), DST-CIMS Banaras Hindu University, Varanasi, Uttar Pradesh, 221005, India ' Department of Computer Science and Engineering IIT (BHU), Varanasi, Uttar Pradesh, 221005, India

Abstract: Signal denoising is one of the most important areas in signal processing. In the present paper, we have denoised a 1D piecewise constant (PWC) signal corrupted by additive white Gaussian noise (AWGN) using the thresholded Haar wavelet denoising method. The central idea of the wavelet transform is the multiresolution decomposition of signals. This becomes advantageous because small objects require high resolution and low resolution is suitable for large objects. In multiresolution decomposition, an approximation component is created using a scaling function, which is often termed as a lowpass filter. Detail components are obtained using wavelet functions, which are often known as highpass filters. A series of approximations of a signal is thus obtained, which has difference in resolution among them by a factor 2. Detail components contain the difference between adjacent approximations. Proper thresholding of the transformed signal results in reduced noise because, in general, the noise component of a signal has a relatively smaller magnitude and wider bandwidth. We show that our method outperforms recently reported non-convex regularisation-based convex 1D total variation denoising method on PWC signals.

Keywords: wavelets; thresholding; denoising; multiresolution analysis.

DOI: 10.1504/IJISTA.2020.112431

International Journal of Intelligent Systems Technologies and Applications, 2020 Vol.19 No.6, pp.517 - 525

Received: 30 Apr 2019
Accepted: 07 Nov 2019
Published online: 15 Jan 2021 *

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Title: Denoising 1D signal using wavelets

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