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| First Page | Document Content | |
|---|---|---|
 Date: 2012-12-19 07:48:14Fast wavelet transform Lifting scheme Multiresolution analysis Fourier transform Time series S transform Continuous wavelet transform Daubechies wavelet Mathematical analysis Wavelets Discrete wavelet transform |
 | Frobenius Additive Fast Fourier Transform Wen-Ding Li Ming-Shing Chen Po-Chun KuoDocID: 1xVYf - View Document |
 | Polynomials and the Fast Fourier Transform (FFT)DocID: 1xUw0 - View Document |
 | Lecture 20, Tues April 4: Shor, Quantum Fourier Transform Last time we started in on Shor’s algorithm, a quantum algorithm that can factor N into p×q in polynomial time by reducing the problem to perDocID: 1xTSU - View Document |
 | Lecture IX: Fourier transform Maxim Raginsky BME 171: Signals and Systems Duke University October 8, 2008DocID: 1uYub - View Document |
 | QUALIFYING EXAMINATION Harvard University Department of Mathematics Tuesday August 30, 2011 (DayLet f be a differentiable function on R whose Fourier transform is boundedDocID: 1uS2D - View Document |