--- title: "Fourier transform" firstLetter: "F" publishDate: 2021-02-22 categories: - Mathematics - Physics - Optics date: 2021-02-22T21:35:54+01:00 draft: false markup: pandoc --- # Fourier transform The **Fourier transform** (FT) is an integral transform which converts a function $f(x)$ into its frequency representation $\tilde{f}(k)$. Great volumes have already been written about this subject, so let us focus on the aspects that are useful to physicists. The **forward** FT is defined as follows, where $A$, $B$, and $s$ are unspecified constants (for now): $$\begin{aligned} \boxed{ \tilde{f}(k) \equiv \hat{\mathcal{F}}\{f(x)\} \equiv A \int_{-\infty}^\infty f(x) \exp\!(i s k x) \dd{x} } \end{aligned}$$ The **inverse Fourier transform** (iFT) undoes the forward FT operation: $$\begin{aligned} \boxed{ f(x) \equiv \hat{\mathcal{F}}^{-1}\{\tilde{f}(k)\} \equiv B \int_{-\infty}^\infty \tilde{f}(k) \exp\!(- i s k x) \dd{k} } \end{aligned}$$ Clearly, the inverse FT of the forward FT of $f(x)$ must equal $f(x)$ again. Let us verify this, by rearranging the integrals to get the [Dirac delta function](/know/concept/dirac-delta-function/) $\delta(x)$: $$\begin{aligned} \hat{\mathcal{F}}^{-1}\{\hat{\mathcal{F}}\{f(x)\}\} &= A B \int_{-\infty}^\infty \exp\!(-i s k x) \int_{-\infty}^\infty f(x') \exp\!(i s k x') \dd{x'} \dd{k} \\ &= 2 \pi A B \int_{-\infty}^\infty f(x') \Big(\frac{1}{2\pi} \int_{-\infty}^\infty \exp\!(i s k (x' - x)) \dd{k} \Big) \dd{x'} \\ &= 2 \pi A B \int_{-\infty}^\infty f(x') \: \delta(s(x' - x)) \dd{x'} = \frac{2 \pi A B}{|s|} f(x) \end{aligned}$$ Therefore, the constants $A$, $B$, and $s$ are subject to the following constraint: $$\begin{aligned} \boxed{\frac{2\pi A B}{|s|} = 1} \end{aligned}$$ But that still gives a lot of freedom. The exact choices of $A$ and $B$ are generally motivated by the [convolution theorem](/know/concept/convolution-theorem/) and [Parseval's theorem](/know/concept/parsevals-theorem/). The choice of $|s|$ depends on whether the frequency variable $k$ represents the angular ($|s| = 1$) or the physical ($|s| = 2\pi$) frequency. The sign of $s$ is not so important, but is generally based on whether the analysis is for forward ($s > 0$) or backward-propagating ($s < 0$) waves. ## Derivatives The FT of a derivative has a very useful property. Below, after integrating by parts, we remove the boundary term by assuming that $f(x)$ is localized, i.e. $f(x) \to 0$ for $x \to \pm \infty$: $$\begin{aligned} \hat{\mathcal{F}}\{f'(x)\} &= A \int_{-\infty}^\infty f'(x) \exp\!(i s k x) \dd{x} \\ &= A \big[ f(x) \exp\!(i s k x) \big]_{-\infty}^\infty - i s k A \int_{-\infty}^\infty f(x) \exp\!(i s k x) \dd{x} \\ &= (- i s k) \tilde{f}(k) \end{aligned}$$ Therefore, as long as $f(x)$ is localized, the FT eliminates derivatives of the transformed variable, which makes it useful against PDEs: $$\begin{aligned} \boxed{ \hat{\mathcal{F}}\{f'(x)\} = (- i s k) \tilde{f}(k) } \end{aligned}$$ This generalizes to higher-order derivatives, as long as these derivatives are also localized in the $x$-domain, which is practically guaranteed if $f(x)$ itself is localized: $$\begin{aligned} \boxed{ \hat{\mathcal{F}} \Big\{ \dv[n]{f}{x} \Big\} = (- i s k)^n \tilde{f}(k) } \end{aligned}$$ Derivatives in the frequency domain have an analogous property: $$\begin{aligned} \dv[n]{\tilde{f}}{k} &= A \dv[n]{k} \int_{-\infty}^\infty f(x) \exp\!(i s k x) \dd{x} \\ &= A \int_{-\infty}^\infty (i s x)^n f(x) \exp\!(i s k x) \dd{x} = \hat{\mathcal{F}}\{ (i s x)^n f(x) \} \end{aligned}$$ ## Multiple dimensions The Fourier transform is straightforward to generalize to $N$ dimensions. Given a scalar field $f(\vb{x})$ with $\vb{x} = (x_1, ..., x_N)$, its FT $\tilde{f}(\vb{k})$ is defined as follows: $$\begin{aligned} \boxed{ \tilde{f}(\vb{k}) \equiv \hat{\mathcal{F}}\{f(\vb{x})\} \equiv A \int_{-\infty}^\infty f(\vb{x}) \exp\!(i s \vb{k} \cdot \vb{x}) \dd[N]{\vb{x}} } \end{aligned}$$ Where the wavevector $\vb{k} = (k_1, ..., k_N)$. Likewise, the inverse FT is given by: $$\begin{aligned} \boxed{ f(\vb{x}) \equiv \hat{\mathcal{F}}^{-1}\{\tilde{f}(\vb{k})\} \equiv B \int_{-\infty}^\infty \tilde{f}(\vb{k}) \exp\!(- i s \vb{k} \cdot \vb{x}) \dd[N]{\vb{k}} } \end{aligned}$$ In practice, in $N$D, there is not as much disagreement about the constants $A$, $B$ and $s$ as in 1D: typically $A = 1$ and $B = 1 / (2 \pi)^N$, with $s = \pm 1$. Any choice will do, as long as: $$\begin{aligned} \boxed{ A B = \bigg( \frac{|s|}{2 \pi} \bigg)^{\!N} } \end{aligned}$$
Differentiation is more complicated for $N > 1$, but the FT is still useful, notably for the Laplacian $\nabla^2 \equiv \dv*[2]{x_1} + ... + \dv*[2]{x_N}$. Let $|\vb{k}|$ be the norm of $\vb{k}$, then for a localized $f$: $$\begin{aligned} \boxed{ \hat{\mathcal{F}}\{\nabla^2 f(\vb{x})\} = - s^2 |\vb{k}|^2 \tilde{f}(\vb{k}) } \end{aligned}$$
## References 1. O. Bang, *Applied mathematics for physicists: lecture notes*, 2019, unpublished.