Questions tagged [fourier-series]

A Fourier series is a decomposition of a periodic function as a linear combination of sines and cosines, or complex exponentials.

If $f$ is a periodic function with period $2\pi$, a Fourier series for $f$ is an expansion of the form $$ f(x) = \frac{a_0} 2 + \sum_{n = 1}^\infty a_n \cos nx + \sum_{n = 1}^\infty b_n \sin nx .$$

This decomposition is useful for solving partial differential equations, and it has important applications in the study of waves.

If $f$ is continuously differentiable, a theorem of Dirichlet states that a Fourier expansion exists where the infinite sums converge uniformly to $f$. Under the weaker assumption that $f \in L^2[0,2\pi]$, there exists a Fourier expansion where the infinite sums converge to $f$ in the $L^2$ sense.

The sines and cosines appearing in the Fourier expansion form an orthogonal basis for $L^2[0,2\pi]$. Therefore, a simple way of evaluating the $a_n$ and $b_n$ coefficients is by orthogonal projection, $$ a_n = \frac 1 \pi \int_0^{2\pi} f(x) \cos nx\ \mathrm dx, \ \ \ \ \ \ \ \ \ b_n = \frac 1 \pi \int_0^{2\pi} f(x) \sin nx\ \mathrm dx.$$

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Why no dependence on the phase in Wikipedia about Fourier series?

I was reading the Wikipedia article about Fourier series to try to understand this concept. While reading about the Fourier series decomposition of a real function the different phases $\phi_n$ appear in the formula for $c_n$. But why in the section…
edamondo
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Why negative sign for $c_n$ in Fourier series?

Why does the integral for determining the coefficients of a complex fourier series contain a negative sign in the exponent: $$c_n = \int_{-a}^{a} f(x)e^{-in\pi x/a} \,dx$$ scouring the internet for an answer, I stumbled upon a proof, and it looks…
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Finding the fourier series representation for a piecewise function

Expand the given function in the appropriate Fourier series: $$\begin{align} f(x) = \begin{cases} x+1 &\mbox{if } -1 \leq x \leq 0 \\ x-1 &\mbox{if } 0 \leq x \lt 1 \end{cases} \end{align}$$ To my knowledge, the first step is to determine whether…
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Doing transformations on trignometric functions

I have a function $$f(x)=\sqrt{1-\cos(x)}$$ with the fundamental period $2\pi$. But I can also write this as $$\sqrt{2} \sin(x/2)$$ whose fundamental period is $4\pi$. Why has the fundamental period changed.
Upstart
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Function not satisfying pointwise convergence and Fourier series

Can you show an example of a function that does not satisfy pointwise convergence theorem hypotheses for Fourier series but that is still expressible as Fourier series? [Added after comment] In particular, I want to know if there is a function whose…
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How is it possible to calculate the length of the interval on x axis, around point of discontinuity that is affected by Gibbs phenomenon?

I have approximation of some arbitrary function with Fourier series. On the image I have circled areas of discontinuity, affected by Gibbs phenomenon How is it possible to calculate the "Radius of the yellow circle", inside of which Gibbs phenomenon…
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Integral representation of a partial sum of a Fourier series using complex exponentials

Consider a periodic function $f: \mathbb{R} \to \mathbb{C}$ of period $T = 2\pi/\omega_0$. What I'd like to know is the integral representation of a partial sum of its Fourier series using complex exponentials. I have the following guess: let $z_0…
Rajesh D
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Proving series converges using Fourier series

I need to prove that for every $0 \le x \le \pi$ $$\sum^{\infty}_{n=-\infty}\frac{e^{2inx}}{1-4n^2}=\frac{\pi}{2}\sin{x}$$ using Fourier series. Let $f(x)$ be a function such that its Fourier series…
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Proving that the fourier coefficients for a pretty smooth function are pretty small

Let $f:[0,2\pi] \rightarrow \mathbb{R}$ be $C^k$ for some $k >0$. Prove that $|\widehat{f}(n)|n|^k|$ is bounded above by some constant independent of $n$. To do this, we've been given the Riemann-Lebesgue lemma and Bessel's inequality. What I…
Kate
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Determine coefficients of a Fourier series

Given the $2\pi$-periodic function $f(t)=t^2$ such that $-\pi \le t \le \pi$, I want to determine the coefficients $f_k$ of the fourier series of this signal. Therefore I use $$f_k = \frac{1}{2\pi} \int_{-\pi}^{\pi} t^2 e^{-ikt}\,dt$$ Is that true?…
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Prove that $ I = \int_{0}^1 \sin(2 \pi x) e^{-2 \pi ikx} dx = \begin{cases} \frac{-ki}{2}, & \text{if $k=\pm1$ } \\ 0, & \text{if $k=0$} \end{cases}$

Prove that $$ I = \int_{0}^1 \sin(2 \pi x) e^{-2 \pi ikx} dx = \begin{cases} \frac{-ki}{2}, & \text{if $k=\pm1$ } \\ 0, & \text{if $k=0$} \end{cases}$$ According to our definition of Fourier Series $\hat{f}(k) = \int_{0}^1 f(x) e^{-2 \pi ikx} dx $…
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Find the fourier series of the following function

"Compute the Fourier series of the periodic function $f(x)$ that is defined in $\mathbb R$ as follows: $$f(x) = |x-2n \pi| $$ for all $x$ s.t. $(2n-1)\pi < x <(2n + 1)\pi.$ Give the definition of a tempered regular distribution, and explain why…
Jessie
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Uniform convergence of Fourier Series, how do I check it?

Let $f(x)=x(\pi-x)$, $x\in (0,\pi)$. The function satisfies the Dirichlet conditions so its Fourier series, $S_f$ converges pointwise to $f$. The definition of a Fourier series of $f$ on $[a,a+L]$ is: $$S(x)=\frac{a_0}{2}+\sum_{n=1}^\infty a_n\cos{…
Spine Feast
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Looking for feedback on Taylor Maclaurin and Fourier series

The Problem: You encounter the following wave when examining a digital switching circuit. You need to create a mathematical model so that you can examine changes in the circuit’s behavior. Explain how you would build a series approximation for…
Tonya
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Fourier coefficients on closed and open intervals

Let a function $f(x)$ be continuous, periodic, differentiable, and square-integrable on an open interval $(a,\,b)$. Will, its Fourier series coefficients change if it had all these qualities for a closed interval $[a,\,b]$. What about half-open and…