Fourier Series

Jean Baptiste Joseph Fourier,a French mathematician and a physicist; was born in Auxerre, France. He initiapzed Fourier series, Fourier transforms and their apppcations to problems of heat transfer and vibrations. The Fourier series, Fourier transforms and Fourier s Law are named in his honour.

Fourier series

To represent any periodic signal x(t), Fourier developed an expression called Fourier series. This is in terms of an infinite sum of sines and cosines or exponentials. Fourier series uses orthoganapty condition.

Fourier Series Representation of Continuous Time Periodic Signals

A signal is said to be periodic if it satisfies the condition x (t) = x (t + T) or x (n) = x (n + N).

Where T = fundamental time period,

ω₀= fundamental frequency = 2π/T

There are two basic periodic signals:

$x(t) = cosomega_0t$ (sinusoidal) &

$x(t) = e^{jomega_0 t} $ (complex exponential)

These two signals are periodic with period $T= 2pi/omega_0$.

A set of harmonically related complex exponentials can be represented as {$phi_k (t)$}

$${ phi_k (t)} = { e^{jkomega_0t}} = { e^{jk({2pi over T})t}} ext{where} ,k = 0 pm 1, pm 2 ..n ,,,.....(1) $$

All these signals are periodic with period T

According to orthogonal signal space approximation of a function x (t) with n, mutually orthogonal functions is given by

$$x(t) = sum_{k = - infty}^{infty} a_k e^{jkomega_0t} ..... (2) $$

$$ = sum_{k = - infty}^{infty} a_kk e^{jkomega_0t} $$

Where $a_k$= Fourier coefficient = coefficient of approximation.

This signal x(t) is also periodic with period T.

Equation 2 represents Fourier series representation of periodic signal x(t).

The term k = 0 is constant.

The term $k = pm1$ having fundamental frequency $omega_0$, is called as 1^st harmonics.

The term $k = pm2$ having fundamental frequency $2omega_0$, is called as 2^nd harmonics, and so on...

The term $k = ±n$ having fundamental frequency $nomega0$, is called as n^th harmonics.

Deriving Fourier Coefficient

We know that $x(t) = Sigma_{k=- infty}^{infty} a_k e^{jk omega_0 t} ...... (1)$

Multiply $e^{-jnomega_0 t}$ on both sides. Then

$$ x(t)e^{-jnomega_0 t} = sum_{k=- infty}^{infty} a_k e^{jk omega_0 t} . e^{-jnomega_0 t} $$

Consider integral on both sides.

$$ int_{0}^{T} x(t) e^{jk omega_0 t} dt = int_{0}^{T} sum_{k=-infty}^{infty} a_k e^{jk omega_0 t} . e^{-jnomega_0 t}dt $$

$$ quad quad quad quad ,, = int_{0}^{T} sum_{k=-infty}^{infty} a_k e^{j(k-n) omega_0 t} . dt$$

$$ int_{0}^{T} x(t) e^{jk omega_0 t} dt = sum_{k=-infty}^{infty} a_k int_{0}^{T} e^{j(k-n) omega_0 t} dt. ,, ..... (2)$$

by Euler s formula,

$$ int_{0}^{T} e^{j(k-n) omega_0 t} dt. = int_{0}^{T} cos(k-n)omega_0 dt + j int_{0}^{T} sin(k-n)omega_0t,dt$$

$$ int_{0}^{T} e^{j(k-n) omega_0 t} dt. = left{ egin{array}{l l} T & quad k = n \ 0 & quad k eq n end{array} ight. $$

Hence in equation 2, the integral is zero for all values of k except at k = n. Put k = n in equation 2.

$$Rightarrow int_{0}^{T} x(t) e^{-jnomega_0 t} dt = a_n T $$

$$Rightarrow a_n = {1 over T} int_{0}^{T} e^{-jnomega_0 t} dt $$

Replace n by k.

$$Rightarrow a_k = {1 over T} int_{0}^{T} e^{-jkomega_0 t} dt$$

$$ herefore x(t) = sum_{k=-infty}^{infty} a_k e^{j(k-n) omega_0 t} $$

$$ ext{where} a_k = {1 over T} int_{0}^{T} e^{-jkomega_0 t} dt $$