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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Relation between the modulus of continuity and the tail sum - Boundedness

I have a query about Fourier series. Let $f(x)\sim \sum_{n=-\infty}^\infty c_n e^{inx}$ where $x\in[-\pi,\pi]$ and assume that this series converges absolutely. Define the tail sum by $E_n = \sum_{\vert k \vert > n} \vert c_k \vert$ for…
Sh7
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Need Simplification/calculation of coefficients in a fourier series

This is the piecewise function I am currently working with $$ f(x) = \begin{cases} -5 \qquad\qquad\ -2 <= x < -1 \\ (3-x^2) \qquad -1< x<1 \\5 \qquad\qquad\qquad1
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What are the Fourier coefficients of multiplying a function with the derivative of another function?

Consider a Fourier series $x(t)=\sum_{n=-\infty}^{\infty} C_n e^{j n \omega_0 t}$. Let's assume $\mathrm{x}_1(\mathrm{t}) {\leftrightarrow} \mathrm{C}_{\mathrm{n}}, \mathrm{x}_2(\mathrm{t}){\leftrightarrow} \mathrm{D}_{\mathrm{n}}$. Then we know…
egc
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constant prefactors and scaling in continuous and discrete fourier transforms

Depending on the definitions, the constant prefactors in continuous and discrete fourier transforms can differ arbitrarily as long as the forward and backward counterparts multiply up to 1/T (period) or 1/2$\pi$ (fourier series/fourier transform).…
feynman
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Fitting discrete points using Fourier series with nonnegative coefficients

Suppose I have a set of desired points $(x_1, f(x_1)), (x_2, f(x_2)),..., (x_n, f(x_n))$, with $x_i\in\mathbb{R}$ and $f(x_i)\in\mathbb{C}$. I want to find a Fourier series for $f(x)$, $$f(x)=\sum_{j=-d}^dp_je^{ijx\omega}$$ that passes through the…
Will
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Optimizing the number of non-zero coefficients of Fourier circle drawings

(For an introduction to Fourier circle drawings, watch e.g. this Mathologer video: https://www.youtube.com/watch?v=qS4H6PEcCCA) Converting a closed line drawing to its Fourier circle equivalent is easy (for some value of easy, anyway): write an…
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Impulse Train Fourier Series Limits

When determining the Fourier Series representation of an impulse train, $x(t) = \sum_{k = -\infty}^{\infty}\delta(t - kT)$ I have noticed that most proofs determine the coefficients using the bounds of $[-T/2, T/2]$ instead of $[0, T]$: $a_k =…
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Why is a Fourier series the same on $[-3,3]$ and on $[-\pi,\pi]$?

I have calculated the Fourier series in Mathematica for a function on an interval $[-3,3]$ and on an interval $[-\pi,\pi]$ and they are exactly the same. The function is: \begin{equation} f(\xi)=\begin{cases} 2, \ \ \ \ -2\le \xi<-1 \\ …
Luthier415Hz
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Continuity of Fourier Coefficients generalized to complex values?

If I have some function $f(x)$ that is periodic with a period going from $-L$ to $L$, its Fourier coefficients in exponential form can be written as $$c_{k}=\frac{1}{2 L} \int_{-L}^{L} f(x) e^{\pi i k x / L} d x $$ Suppose I generalize these…
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Existence of a piecewise smooth, periodic, continuous function

Does there exists a piecewise smooth, periodic, and continuous function $f$ such that $$\vert \hat{f}(n)\vert > \frac{1}{n^{1/3}}$$ for all $n > 10$? Honestly, i don't know where to start and i've been stuck for at least a day now. Any hints on how…
Eugene
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Why can any function be expressed as a sum of trigononmetric function? Why are fourier series equal to its function?

I understand how to calculate the fourier coefficients and I understand the importance of orthogonality of sines and cosines. But why can any periodic functio be expressed as a linear combination of sines and cosines? Fourier series is such a common…
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Fourier series in spatial domain, interpretaion through wavelength.

I have been trying to understand how I should interpret spatial Fourier series in terms of wavelength. Let me consider Fourier series of a periodic function in $[-\pi,\pi]$, $$f(x) = \frac{a_{0}}{2}+\sum_{n=1}^{\infty}a_{n}\cos(nx) +…
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Question about Fourier series of derivative of $f$

We have function $f(x)$ and we knows its fourier series. What can we say about fourier series of $f'$ ? For example, fourier series of $f$ is $\sum ^{\infty }_{n=0}\dfrac{1}{7n^{6}}\cos nx$ What can I say for fourier series of derivative of…
Elise9
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Let $f$ be function and Fourier series of $f$ implies that $f$ is contiouns

First of all, I am beginner for Fourier series I am trying to learn it. I have a function $f(x) \in L^2 \left( \left[\pi,\pi \right] \right) $ and its Fourier Series is $$\sum ^{\infty }_{n=0}\dfrac{1}{n^{3}}\sin nx$$ My question is how can I say…
Fuat Ray
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Dirichlet kernel in product form

Define the Dirichlet Kernel by $$D_{N}(\mathbf{x})=\sum_{k=-N}^{N}...\sum_{k=-N}^{N}\phi_{k}(\mathbf{x})= \prod_{i=1}^{d}\frac{\sin((N+\frac{1}{2})x_{i})}{\sin(\frac{x_{i}}{2})}$$ I am asked to derive this product form. I begin by taking the sum of…