Fourier series: Difference between revisions

Revision as of 17:56, 6 December 2004

Periodic Functions

A continuous time signal $x (t)$ is said to be periodic if there is a positive nonzero value of T such that

$s (t + T) = s (t)$ for all $t$

Dirichlet Conditions

The conditions for a periodic function $f$ with period 2L to have a convergent Fourier series.

Theorem:

Let $f$ be a piecewise regular real-valued function defined on some interval [-L,L], such that $f$ has only a finite number of discontinuities and extrema in [-L,L]. Then the Fourier series of this function converges to $f$ when $f$ is continuous and to the arithmetic mean of the left-handed and right-handed limit of $f$ at a point where it is discontinuous.

The Fourier Series

A Fourier series is an expansion of a periodic function $f$ in terms of an infinite sum of sines and cosines. Fourier series make use of the orthogonality relationships of the sine and cosine functions.

$f (t) = \sum_{k = - \infty}^{\infty} α_{k} e^{\frac{j 2 π k t}{T}}$ .

@@ Line 1: / Line 1: @@
+==Periodic Functions==
+A continuous time signal <math>x(t)</math> is said to be periodic if there is a positive nonzero value of T such that
+<center>
+<math> s(t + T) = s(t)</math> for all <math>t</math>
+</center>
 ==Dirichlet Conditions==
 The conditions for a periodic function <math>f</math> with period 2L to have a convergent Fourier series.

Fourier series: Difference between revisions

Revision as of 17:56, 6 December 2004

Contents

Periodic Functions

Dirichlet Conditions

Theorem:

The Fourier Series

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Fourier series: Difference between revisions

Revision as of 17:56, 6 December 2004

Periodic Functions

Dirichlet Conditions

Theorem:

The Fourier Series

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