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Computation of Wavelet and Multiwavelet Transforms Using Fast Fourier Transform

Walid A. Mahmoud

2021Journal Port Science Research17 citationsDOIOpen Access PDF

Abstract

A novel fast and efficient algorithm was proposed that uses the Fast Fourier Transform (FFT) as a tool to compute the Discrete Wavelet Transform (DWT) and Discrete Multiwavelet Transform. The Haar Wavelet Transform and the GHM system are shown to be a special case of the proposed algorithm, where the discrete linear convolution will adapt to achieve the desired approximation and detail coefficients. Assuming that no intermediate coefficients are canceled and no approximations are made, the algorithm will give the exact solution. Hence the proposed algorithm provides an efficient complexity verses accuracy tradeoff. The main advantages of the proposed algorithm is that high band and the low band coefficients can be exploited for several classes of signals resulting in very low computation.

Topics & Concepts

Fast Fourier transformDiscrete wavelet transformAlgorithmHarmonic wavelet transformConvolution (computer science)Discrete Fourier transform (general)ComputationSecond-generation wavelet transformWavelet transformStationary wavelet transformMathematicsWaveletHaar waveletHaarFractional Fourier transformPrime-factor FFT algorithmComputer scienceFourier transformArtificial intelligenceMathematical analysisFourier analysisArtificial neural networkImage and Signal Denoising MethodsBlind Source Separation TechniquesDigital Filter Design and Implementation
Computation of Wavelet and Multiwavelet Transforms Using Fast Fourier Transform | Litcius