New answers tagged fourier-analysis
6
votes
Fourier coefficients of the logarithm of a given function
What you stated is correct. The crude statement is
$|d_n|\leq C(\mu)e^{-\mu n}$, for every $\mu<\mu_0$, where
$$\mu_0=\min\{\lambda,\theta_0\},\; \theta_0=\min\{|\theta|:
f(x+i\theta)=0\}.$$
Proof. ...
- 87.2k
3
votes
Accepted
Question regarding proof of Littlewood-Paley
Apologies if I've misunderstood the question; Grafakos comments in this paragraph that
The fundamental ingredient in the proof is that $f=\sum_{\mathbf{j}\in\mathbb{Z}^n}\Delta_\mathbf{j}^\#\Delta_\...
- 354
5
votes
Accepted
A fractional weighted Poincaré inequality
It is not true. Start with a function $u$ which vanishes for $x<0$ and is equal to $1$ for $0 \leq x \leq \frac 12$ and then smooth from $x \geq \frac 12$. The Fourier coefficients behave like $1/n$...
- 4,765
4
votes
Accepted
Any references for generalised square functions?
For $0<p<\infty$, $0<q\le\infty$ and $s\in\mathbb R$, the Triebel-Lizorkin space $F_{pq}^s(\mathbb R^n)$ is the set of all (tempered distributions) $f$ such that $\big\||\{2^{js}\cdot P_jf\}...
- 786
0
votes
Steinhaus theorem and Hausdorff dimension
In the paper by Feng and Wu, they introduced a notion of thickness, that generalized the Newhouse thickness in the line. They showed that if a set has positive Feng-Wu thickness, then the sumset after ...
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