Furijeova transformacija

Furijeova transformacija razlaže funkciju vremena (signal) u frekvencije koje ga čine, na sličan način kao što muzički akordi mogu biti izraženi kao frekvencije njegovih sastavnih nota.

Istorija[uredi | uredi izvor]

Žozef Furije je 1822. godine pokazao da neke funkcije mogu biti zapisane kao beskonačna suma harmonika.^[1]

Definicija[uredi | uredi izvor]

Furijeova transformacija signala $f(t)$ računa se na sledeći način:

$F(j\omega )=\int \limits _{-\infty }^{\infty }f(t)e^{-j\omega t}dt$

$F(j\omega )$ je kompleksna veličina. Njen moduo naziva se spektralna gustina amplituda, a argument spektralna gustina faza.^[2]^[3]

Inverzija[uredi | uredi izvor]

Inverzna Furijeova transformacija je:

$f(t)={\frac {1}{2\pi }}\int \limits _{-\infty }^{\infty }F(j\omega )e^{j\omega t}d\omega$

Osobine Furijeove transformacije[uredi | uredi izvor]

Linearnost[uredi | uredi izvor]

Za bilo koje kompleksne brojeve $a$ i $b$ , ako je $h(x)=af(x)+bg(x)$ , važi da je $H(j\omega )=aF(j\omega )+bG(j\omega )$ .

Translacija[uredi | uredi izvor]

Za bilo koji realan broj $x_{0}$ , ako je $h(x)=f(x-x_{0})$ , važi da je $H(j\omega )=e^{j\omega tx_{0}}F(j\omega )$ .

Vidi još[uredi | uredi izvor]

Reference[uredi | uredi izvor]

^ Fourier, Jean Baptiste Joseph baron (1822). Théorie analytique de la chaleur (na jeziku: francuski). Chez Firmin Didot, père et fils.
^ Kaiser 1994, str. 29.
^ Rahman 2011, str. 11.

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Spoljašnje veze[uredi | uredi izvor]

Encyclopedia of Mathematics
Weisstein, Eric W. „Fourier Transform”. MathWorld.

[1] Fourier, Jean Baptiste Joseph baron (1822). Théorie analytique de la chaleur (na jeziku: francuski). Chez Firmin Didot, père et fils.

[2] Kaiser 1994, str. 29.

[3] Rahman 2011, str. 11.

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