TY - BOOK ID - 16241954 TI - Computational Signal Processing with Wavelets PY - 2017 SN - 331965747X 3319657461 PB - Cham : Springer International Publishing : Imprint: Birkhäuser, DB - UniCat KW - Mathematics. KW - Fourier analysis. KW - Computer mathematics. KW - Numerical analysis. KW - Numerical Analysis. KW - Fourier Analysis. KW - Computational Science and Engineering. KW - Signal processing KW - Wavelets (Mathematics) KW - Wavelet analysis KW - Harmonic analysis KW - Computer science. KW - Informatics KW - Science KW - Analysis, Fourier KW - Mathematical analysis KW - Computer mathematics KW - Electronic data processing KW - Mathematics UR - https://www.unicat.be/uniCat?func=search&query=sysid:16241954 AB - This unique resource examines the conceptual, computational, and practical aspects of applied signal processing using wavelets. With this book, readers will understand and be able to use the power and utility of new wavelet methods in science and engineering problems and analysis. The text is written in a clear, accessible style avoiding unnecessary abstractions and details. From a computational perspective, wavelet signal processing algorithms are presented and applied to signal compression, noise suppression, and signal identification. Numerical illustrations of these computational techniques are further provided with interactive software (MATLAB code) that is available on the World Wide Web. Topics and Features Continuous wavelet and Gabor transforms Frame-based theory of discretization and reconstruction of analog signals is developed New and efficient "overcomplete" wavelet transform is introduced and applied Numerical illustrations with an object-oriented computational perspective using the Wavelet Signal Processing Workstation (MATLAB code) available This book is an excellent resource for information and computational tools needed to use wavelets in many types of signal processing problems. Graduates, professionals, and practitioners in engineering, computer science, geophysics, and applied mathematics will benefit from using the book and software tools. The present, softcover reprint is designed to make this classic textbook available to a wider audience. A self-contained text that is theoretically rigorous while maintaining contact with interesting applications. A particularly noteworthy topic…is a class of ‘overcomplete wavelets’. These functions are not orthonormal and they lead to many useful results. —Journal of Mathematical Psychology. ER -