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, $$ a_n = \frac 1 \pi \int_0^{2\pi} f(x) \cos nx\ \mathrm dx, \ \ \ \ \ \ \ \ \ b_n = \frac 1 \pi \int_0^{2\pi} f(x) \sin nx\ \mathrm dx.$$

5656 questions
1
vote
0 answers

Fourier series from first principles

Hello i need help with understanding what is meant by this question $$s(t)=2+e^{4t} $$ Expand the signal $s(t)$ into both its trigonometric and complex exponential Fourier series from first principles. i get how to get the Fourier series of…
1
vote
3 answers

Fourier Series of The Sine Function

I am computing the Fourier series of $$f(x)=\sin\frac{\pi x}{L}.$$ The Fourier series of a piecewise smooth function $f(x)$ defined on the interval $-L\leq x\leq L$ is given by $$f(x)\sim a_0+\sum_{n=1}^{\infty}a_n\cos\frac{n\pi…
wjmolina
  • 6,218
  • 5
  • 45
  • 96
1
vote
2 answers

Fourier Series of $a\cos^{2}(b(x-c))+d$

I am trying to find the Fourier series of $f(x)=a\cos^{2}(b(x-c))+d$. I have already done this for $b=2$ which yields a simple result. For the general case, the coefficients $a_{n}$ and $b_{n}$ become much more complicated. So far, after solving for…
1
vote
2 answers

Fourier series periodic extension sketch

Hi there don't really get this question: Sketch the periodic extension of the function $f(x) = x^2$ for $−1 ≤ x ≤ 1$ with period 2 and find its Fourier series. Does this just mean draw a normal $x^2$ graph from $-1$ to $1$? And then I would…
Malk
  • 23
1
vote
1 answer

Period of $|\sin x|$ for Fourier series

I was doing Fourier series problem sets but encountered a rather surprising "problem". The first problem stated: Find the Fourier series for $f(x)=|\sin x|$ for $-\pi < x < \pi$. Thus, the implied period of the function that I used for…
tummath
  • 11
1
vote
1 answer

Help finding inverse Fourier transform of a function.

I have the function $f(x) = 1 -|x|$ for $|x|\leq 1$. And zero everywhere else. I'm supposed to find the inverse Fourier transform of the function but I only have a formula for the inverse Fourier transform of a vector not a function in my notes. Can…
1
vote
1 answer

Fourier series coefficients of Hilbert transform

Suppose signal $x(t)$ is periodic with period T. Then $x(t)$ can be represented by its Fourier series representation $$x(t)=\sum_{k=-\infty} ^\infty{} X_ke^{j2\pi kt/T}$$ Let the fourier series representation of $$y(t)=\hat x(t)=\sum_{k=-\infty}…
Shine Sun
  • 545
1
vote
1 answer

What is the procedure for determining when to rewrite the integral for the Fourier series?

I was practicing Fourier Series earlier for an exam I have coming up, and I noticed something that has got me incredibly confused. I'll use the following problem to demonstrate: Periodic Function. The function is evidently odd, so it will contain…
user406315
  • 11
  • 2
1
vote
1 answer

Calculating coefficient of a Fourier Series: problem with an integral

I'm calculating coefficients of a Fourier Series. I'm seeing a solved problem and I don't understand the following equality $\int_{0}^{\pi} \sin(x)\cos(nx) dx = \frac{1+(-1)^n}{1-n^2}$ I tried to compute the integral but I'm not getting there. Can…
1
vote
0 answers

Lipschitz constant of Fejer kernel is O(n)

Is it true that the Fejer kernel $\frac{\sin(nx/2)}{N\sin (x/2)}$ has Lipschitz constant $O(n)$, and if so, is there a straightforward proof that does not involve nasty calculus?
keej
  • 1,213
1
vote
2 answers

Stuck in the proof that if $f\in L^1(\mathbb{T})$ and $\hat{f}\in\ell^1(\mathbb{Z})$, then $f\in L^2(\mathbb{T})$

As the title states, I'm stuck showing that, if $f\in L^1(\mathbb{T})$ has absolutely summable Fourier coefficients, then $f$ is square integrable in the torus (wrt Lebesgue measure). The book I'm reading (Folland's Real Analysis) states: Since the…
Reveillark
  • 13,044
1
vote
1 answer

Derive a Fourier expansion of the piece-wise function and prove $\pi = \sqrt{\sum_{n=1}^\infty (\frac{6}{n^2})} $

A periodic function f with period $2\pi$ is defined by $f(t) =$ \begin{array}{ll} t^2 & 0 \leq x\leq \pi \\ 0 & \pi \leq x\leq 2 \pi \\ \end{array} (a) What is the value of the function t = $\pi /2 $ and $t = - \pi/2$ (b) Derive a…
user2250537
  • 1,101
1
vote
1 answer

Representing $\frac{\pi^2}{8}$ using a Fourier series for $f(x) = |x|$

Hi I am practicing fourier series and am doing a problem that asks you to use $f(x) = |x|$ to derive the series representation $\frac{\pi^2}{8} = \sum_{n=1}^\infty \frac{1}{(2n-1)^2}$ What I have done so far is say that $f(x) = |x|$ is an even…
1
vote
0 answers

Fourier Series Help

I have the following function: $t(x) = e^{-j k_0 d_0}e^{-i (n-1) k_0 \frac{d_0}{2} \cos(2\pi x/\lambda))}$, which can be written in a Fourier series as $t(x) = \sum_q(C_q e^{-i q 2 \pi x/\lambda})$, where $C_q$ are the Fourier coefficients. However,…
1
vote
1 answer

When to use Exponential Fourier series versus Trigonometric Fourier series?

I am usually more comfortable working with sines and cosines. However, its often cleaner and more efficient to work with exponentials. Is there a reason other then preference, to use one over the other? EDIT: Thinking more on this, Exp Fourier…
Michael
  • 111