Jenkins, W.K. “Fourier Series, Fourier Transforms, and the DFT” Digital Signal Processing Handbook Ed. Vijay K. Madisetti and Douglas B. Williams Boca Raton: CRC Press LLC, 1999
OKAN K. ERSOY 2007 Preface Diffraction and imaging are central topics in many modern and scientific fields. Fourier analysis and sythesis techniques are a unifying theme throughout this subject matter. For example, many modern imaging techniques hav
Traditionally, Fourier analysis has been focused the analysis of func- tions in terms of linear phase functions such as the sequence n ! e(n) = e2in. In recent years, though, applications have arisen - particularly in connection with problems involv
The discrete Fourier transform (DFT) matrix has a manifold of fractionalizations that depend on the choice of its eigenbases. One prominent basis is that of Mehta functions; here we examine a family of fractionalizations of the DFT stemming from q-e
