Difference between revisions of "Butterworth Filters"

Butterworth filters are a class of all-pole filters, where the poles of the normalized transfer function are equally spaced along the unit circle (${\displaystyle \omega _{0}=1\,{\text{rad/s}}}$). This results in a maximally flat pass-band magnitude response, or equivalently:

${\displaystyle \left.{\frac {\partial ^{N}\left|H\left(j\omega \right)\right|}{\partial \omega ^{N}}}\right|_{\omega =0}=0}$

(1)

This means that the ${\displaystyle N^{\text{th}}}$ derivative of the magnitude at DC is zero.

The Low-Pass Butterworth Filter

The low-pass Butterworth filter has the following magnitude response:

${\displaystyle \left|H\left(j\omega \right)\right|^{2}={\frac {1}{1+\left({\frac {\omega }{\omega _{0}}}\right)^{2N}}}}$

(2)

Where ${\displaystyle N}$ is the filter order and ${\displaystyle \omega _{0}}$ is the ${\displaystyle -3\,{\text{dB}}}$ frequency. Note that ${\displaystyle \left|H\left(j\omega \right)\right|^{2}=\left|H\left(s\right)\right|^{2}=H\left(s\right)\cdot H^{*}\!\left(s\right)}$ at ${\displaystyle s=j\omega }$. Thus:

${\displaystyle H\left(s\right)\cdot H^{*}\left(s\right)={\frac {1}{1+\left({\frac {-s^{2}}{\omega _{0}^{2}}}\right)^{N}}}}$

(3)