Mathematics-Online lexicon: Fourier Basis

	[home] [lexicon] [problems] [tests] [courses] [auxiliaries] [notes] [staff]
	Mathematics-Online lexicon:
	Fourier Basis

A B C D E F G H I J K L M N O P Q R S T U V W X Y Z

overview

Taking the powers of the root of unity

$\displaystyle w_n = \exp(2\pi\mathrm{i}/n)\, ,$

we obtain an orthogonal basis of $\mathbb{C}^n$ . The matrix of the basis vectors is

$\displaystyle \left(\begin{array}{ccc} w_n^{0\cdot 0} & \cdots & w_n^{(n-1)\cd... ...w_n^{0\cdot (n-1)} & \cdots & w_n^{(n-1)\cdot (n-1)} \end{array}\right)\, .$

Orthogonality of the columns can easily be verified. The (complex) scalar product of the

-th and the

-th basis vector amounts to

$\displaystyle \sum_{\ell=0}^{n-1} w_n^{j\ell} \overline{w_n^{k\ell}} = \sum_\ell w_n^{(j-k)\ell} = \frac{w_n^{(j-k)n} - 1}{w_n^{j-k}-1}\, ,$

and the numerator equals zero since

For we have $w_4 = \exp(2\pi\mathrm{i}/4)=\mathrm{i}$ , and we obtain

$\displaystyle \left(\begin{array}{cccc} 1 & 1 & 1 & 1 \\ 1 & \mathrm{i} & -1... ...& -1 & 1 & -1 \\ 1 & -\mathrm{i} & 1 & \mathrm{i} \end{array}\right)\, .$

(Authors: App/Burkhardt/Höllig)

[Examples] [Links]

automatically generated 1/18/2005