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Questions tagged [harmonic-analysis]

Harmonic analysis is the generalisation of Fourier analysis. Use this tag for analysis on locally compact groups (e.g. Pontryagin duality), eigenvalues of the Laplacian on compact manifolds or graphs, and the abstract study of Fourier transform on Euclidean spaces (singular integrals, Littlewood-Paley theory, etc). Use the (wavelets) tag for questions on wavelets, and the (fourier-analysis) for more elementary topics in Fourier theory.

Harmonic analysis can be considered a generalisation of Fourier analysis that has interactions with fields as diverse as isoperimetric inequalities, manifolds and number theory.

Abstract harmonic analysis is concerned with the study of harmonic analysis on topological groups, whereas Euclidean harmonic analysis deals with the study of the properties of the Fourier transform on $\mathbb{R}^n$.

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Haar measure on $\mathbb{C} \setminus 0$.

I want to construct a Haar measure on $\mathbb{C} \setminus 0$. That is, a Borel measure $\mu$ on $\mathbb{C} \setminus 0$ such that $\mu(zS) = \mu(S)$ for all $z \in \mathbb{C} \setminus 0$ and all Borel sets $S$. I want to take the following…
nigel
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estimate of fourier transform

I am reading a paper and I don't understand one thing in the paper.Consider the convolution operator $Tf=f*\mu$ acting on $f\in L^p(\mathbb{R}^n)$, where $\mu$ is a measure defined by $\int_{\mathbb{R}^n}gd\mu=\int_{-1}^1g(h(t))dt$ and…
user146507
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Solve Intergrals Using Inverse Fourier Transform

a)Find f(x), the insverse fourier transform of F(ω) b) Does the fourier transform of f(x) equal to F(ω)? c)use your answers to calculate these Integrals: if I'm not mistaken the answer to a is: as to b,c i not sure. please help!
John Dough
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Can the 0 element of the Fourier Algebra be represented as a coefficient function of two non-zero vectors?

Consider an infinite discrete group $G$, and its associated Hilbert space $l^{2}(G)$. For $t\in G$, let $\lambda(t):l^{2}(G)\to l^{2}(G)$ denote the map $[\lambda(t)x](s) = x(t^{-1}s)$. That is, $\lambda:G\to B(l^{2}(G))$ is the left regular…
roo
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Big theta notation of harmonic series

I want to prove that big theta notation of the harmonic series is $\Theta(\log n)$. I want to work with integral to show that. I attempted this: $$\ln(n)=\int^n_1 \frac{dx}x \le \sum _{k=1} ^n \frac1k \le 1 + \int^n_2 \frac{dx}x = 1 +…
user11001
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Solving the equation $\int G(t) dt =\frac{\sin x}{x}$

I have to solve the equation $$\int_{\mathbb R} \frac{f(t)}{1+(x-t)^2} dt =\frac{\sin x}{x}.$$ I tried change of variables to make the $\frac{1}{1+(x-t)^2}$ part resemble $e^{h(x)}$ so I can use the inverse Fourier transform. But I can't get it…
Ludolila
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Explain the proof of proposition (3.4) of Gerald B. Folland "A Course in Abstract Harmonic Analysis" book

Please explain the specified phrase in more details:
Ehsan zarei
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