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---
title: "Convolution theorem"
sort_title: "Convolution theorem"
date: 2021-02-22
categories:
- Mathematics
layout: "concept"
---
The **convolution theorem** states that a convolution in the direct domain
is equal to a product in the frequency domain. This is especially useful
for computation, replacing an $$\mathcal{O}(n^2)$$ convolution with an
$$\mathcal{O}(n \log(n))$$ transform and product.
## Fourier transform
The convolution theorem is usually expressed as follows, where
$$\hat{\mathcal{F}}$$ is the [Fourier transform](/know/concept/fourier-transform/),
and $$A$$ and $$B$$ are constants from its definition:
$$\begin{aligned}
\boxed{
\begin{aligned}
A \cdot (f * g)(x) &= \hat{\mathcal{F}}{}^{-1}\{\tilde{f}(k) \: \tilde{g}(k)\} \\
B \cdot (\tilde{f} * \tilde{g})(k) &= \hat{\mathcal{F}}\{f(x) \: g(x)\}
\end{aligned}
}
\end{aligned}$$
{% include proof/start.html id="proof-fourier" -%}
We expand the right-hand side of the theorem and
rearrange the integrals:
$$\begin{aligned}
\hat{\mathcal{F}}{}^{-1}\{\tilde{f}(k) \: \tilde{g}(k)\}
&= B \int_{-\infty}^\infty \tilde{f}(k) \Big( A \int_{-\infty}^\infty g(x') \: e^{i s k x'} \dd{x'} \Big) e^{-i s k x} \dd{k}
\\
&= A \int_{-\infty}^\infty g(x') \Big( B \int_{-\infty}^\infty \tilde{f}(k) \: e^{-i s k (x - x')} \dd{k} \Big) \dd{x'}
\\
&= A \int_{-\infty}^\infty g(x') \: f(x - x') \dd{x'}
= A \cdot (f * g)(x)
\end{aligned}$$
Then we do the same again,
this time starting from a product in the $$x$$-domain:
$$\begin{aligned}
\hat{\mathcal{F}}\{f(x) \: g(x)\}
&= A \int_{-\infty}^\infty f(x) \Big( B \int_{-\infty}^\infty \tilde{g}(k') \: e^{-i s x k'} \dd{k'} \Big) e^{i s k x} \dd{x}
\\
&= B \int_{-\infty}^\infty \tilde{g}(k') \Big( A \int_{-\infty}^\infty f(x) \: e^{i s x (k - k')} \dd{x} \Big) \dd{k'}
\\
&= B \int_{-\infty}^\infty \tilde{g}(k') \: \tilde{f}(k - k') \dd{k'}
= B \cdot (\tilde{f} * \tilde{g})(k)
\end{aligned}$$
{% include proof/end.html id="proof-fourier" %}
## Laplace transform
For functions $$f(t)$$ and $$g(t)$$ which are only defined for $$t \ge 0$$,
the convolution theorem can also be stated using
the [Laplace transform](/know/concept/laplace-transform/):
$$\begin{aligned}
\boxed{(f * g)(t) = \hat{\mathcal{L}}{}^{-1}\{\tilde{f}(s) \: \tilde{g}(s)\}}
\end{aligned}$$
Because the inverse Laplace transform $$\hat{\mathcal{L}}{}^{-1}$$ is
unpleasant, the theorem is often stated using the forward transform
instead:
$$\begin{aligned}
\boxed{\hat{\mathcal{L}}\{(f * g)(t)\} = \tilde{f}(s) \: \tilde{g}(s)}
\end{aligned}$$
{% include proof/start.html id="proof-laplace" -%}
We expand the left-hand side.
Note that the lower integration limit is 0 instead of $$-\infty$$,
because we set both $$f(t)$$ and $$g(t)$$ to zero for $$t < 0$$:
$$\begin{aligned}
\hat{\mathcal{L}}\{(f * g)(t)\}
&= \int_0^\infty \Big( \int_0^\infty g(t') \: f(t - t') \dd{t'} \Big) e^{-s t} \dd{t}
\\
&= \int_0^\infty \Big( \int_0^\infty f(t - t') \: e^{-s t} \dd{t} \Big) g(t') \dd{t'}
\end{aligned}$$
Then we define a new integration variable $$\tau = t - t'$$, yielding:
$$\begin{aligned}
\hat{\mathcal{L}}\{(f * g)(t)\}
&= \int_0^\infty \Big( \int_0^\infty f(\tau) \: e^{-s (\tau + t')} \dd{\tau} \Big) g(t') \dd{t'}
\\
&= \int_0^\infty \Big( \int_0^\infty f(\tau) \: e^{-s \tau} \dd{\tau} \Big) g(t') \: e^{-s t'} \dd{t'}
\\
&= \int_0^\infty \tilde{f}(s) \: g(t') \: e^{-s t'} \dd{t'}
= \tilde{f}(s) \: \tilde{g}(s)
\end{aligned}$$
{% include proof/end.html id="proof-laplace" %}
## References
1. O. Bang,
*Applied mathematics for physicists: lecture notes*, 2019,
unpublished.
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