Maurice Robert Kibler
Published 2010-10-28Version 1
The present chapter [submitted for publication in "Fourier Transforms, Theory and Applications", G. Nikolic (Ed.), InTech (Open Access Publisher), Vienna, 2011] is concerned with the introduction and study of a quadratic discrete Fourier transform. This Fourier transform can be considered as a two-parameter extension, with a quadratic term, of the usual discrete Fourier transform. In the case where the two parameters are taken to be equal to zero, the quadratic discrete Fourier transform is nothing but the usual discrete Fourier transform. The quantum quadratic discrete Fourier transform plays an important role in the field of quantum information. In particular, such a transformation in prime dimension can be used for obtaining a complete set of mutually unbiased bases.
Comments: 36 pages, submitted for publication in "Fourier Transforms, Theory and Applications", G. Nikolic (Ed.), InTech (Open Access Publisher), Vienna, 2011
Journal: Quadratic discrete Fourier transform and mutually unbiased bases, G. Nikolic (Ed.) (2010) 103-138
On mutually unbiased bases: Passing from d to d**2
Mutually unbiased bases: tomography of spin states and star-product scheme
Angular Momentum and Mutually Unbiased Bases
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