03782nam 2200505Ia 450 991043757690332120200520144314.01-4471-4941-610.1007/978-1-4471-4941-5(OCoLC)826292328(MiFhGG)GVRL6WPT(CKB)2670000000341762(MiAaPQ)EBC1156142(EXLCZ)99267000000034176220100125d2013 uy 0engurun|---uuuuatxtccrEfficient algorithms for discrete wavelet transform with applications to denoising and fuzzy inference systems /K. K. Shukla, Arvind K. Tiwari1st ed. 2013.London Springer London Imprint: Springer20131 online resource (ix, 91 pages) illustrations (some color)SpringerBriefs in computer science"ISSN: 2191-5768."1-4471-4940-8 Includes bibliographical references.Introduction -- Filter Banks and DWT -- Finite Precision Error Modeling and Analysis -- PVM Implementation of DWT-Based Image Denoising -- DWT-Based Power Quality Classification -- Conclusions and Future Directions.Transforms are an important part of an engineer’s toolkit for solving signal processing and polynomial computation problems. In contrast to the Fourier transform-based approaches where a fixed window is used uniformly for a range of frequencies, the wavelet transform uses short windows at high frequencies and long windows at low frequencies. This way, the characteristics of non-stationary disturbances can be more closely monitored. In other words, both time and frequency information can be obtained by wavelet transform. Instead of transforming a pure time description into a pure frequency description, the wavelet transform finds a good promise in a time-frequency description. Due to its inherent time-scale locality characteristics, the discrete wavelet transform (DWT) has received considerable attention in digital signal processing (speech and image processing), communication, computer science and mathematics. Wavelet transforms are known to have excellent energy compaction characteristics and are able to provide perfect reconstruction. Therefore, they are ideal for signal/image processing. The shifting (or translation) and scaling (or dilation) are unique to wavelets. Orthogonality of wavelets with respect to dilations leads to multigrid representation. The nature of wavelet computation forces us to carefully examine the implementation methodologies. As the computation of DWT involves filtering, an efficient filtering process is essential in DWT hardware implementation. In the multistage DWT, coefficients are calculated recursively, and in addition to the wavelet decomposition stage, extra space is required to store the intermediate coefficients. Hence, the overall performance depends significantly on the precision of the intermediate DWT coefficients. This work presents new implementation techniques of DWT, that are efficient in terms of computation requirement, storage requirement, and with better signal-to-noise ratio in the reconstructed signal.SpringerBriefs in computer science.Digital imagesMathematicsWavelets (Mathematics)Digital imagesMathematics.Wavelets (Mathematics)515.723Shukla K. K1060929Tiwari Arvind K1763336MiAaPQMiAaPQMiAaPQBOOK9910437576903321Efficient algorithms for discrete wavelet transform4203721UNINA