Dear All, Could anyone suggest a source where I can find the difference between weak and strong conversion. Thanks and Best Regards, Ahmed Ibrahim ... ...
The Facultad de Ciencias of the University of Colima, México, is offering a permanent position of Full Time Research Professor in mathematics, and a...
one may even take S^1= multiplicative group of all complex numbers with modulus 1.every element in it is a square! --- In harmonicanalysis@yahoogroups.com,...
I define a maximal operator : T(f)=sup_m T_m(f) où $T_m$ is the operator being the multiplication by the function $m$ in Fourier : $T_m(f)=F(mF(f))$ où $F$...
T(f) defined in this way, seems to be a constant function equal to L^1 norm of the Fourier transform restricted to [-1,1]. It is certainly not bounded in any...
Maria Roginskaya
maria@...
Mar 24, 2005 6:38 pm
274
Try these books 1. Functional Analysis: An Introduction / Yuli Eidelman, Vitali Milman and Antonis Tsolomitis 2. Introductory real analysis / A.N. Kolmogorov...
Hi I'm new here. I'm a final year engineering student in Malaysia and I need some help on my final year project. Can you guys/gals recommend me any reference...
Hi, every one To extending characters from a subgroup, I want to know that: If G be a LCA non-discrete group and two characters of G be the same on an open...
One can probably go through the A^p theory to derive such an inequality in the product setting. See this paper for elements of such a theory. R. Fefferman,...
Michael Lacey
lacey@...
May 27, 2005 5:13 pm
281
hi, I'm developing a harmonic load flow for power system network. I'm trying to use the iterative harmonic analysis technique. Anyone can suggest where i can...
The Norbert Wiener Center for Harmonic Analysis and Applications ... chenghocklim <chenghocklim@...> wrote:hi, I'm developing a harmonic load flow for...
http://www.campusi.com/isbn_0471975486.htm chenghocklim <chenghocklim@...> wrote:hi, I'm developing a harmonic load flow for power system network. I'm ...
Hi, Let S^1 be the unit circle in the complex plane, and let End(S^1) be the group of self-homomorphisms of S^1,(with the topology inherited from (S^1)^(S^1),...
I am trying to get some a priori estimates for Cahn-Hilliard equation. u_t + {\Delta}^2 u = \Delta f(u) where \Delta is the Laplacian. f(u) = \gamma ( u^3 -...
I've gotten interested in Hardy's functions since I have been working on an old paper, by an italian mathematician in which he gives necessary and sufficient...
www.princeton.edu/~lbpierce/theses/junior_paper.pdf giangy72 <giangy72@...> wrote:I've gotten interested in Hardy's functions since I have been working...
Dear all, I am writing to let you know about a new online mathematics journal, founded by Izabella Laba, Sinai Robins, and Alex Iosevich, dedicated to the...
the image of the map (exp(it),exp(iat)) a any irrational number ( as t runs through the real line )is the "solenoid"or the"winding line" on the torus;it is a...
We know that the convolution product *of the fourier transform F of two given functions f and g behaves well respect to the ordinary product . between...
... of two given functions f ... the value 0 or 1 the ... which in turns correspond ... In principle there is a formula, but it is not all that pretty. If f...
Thanks a lot for the clarification, that was very helpful. Does the anwer suggest that, for certain class of functions (with more restrictions than bounded)...
Hi Is there a proof that the output across different tones of Discrete Fourier transform (DFT) is dependent? And Is there a proof that as these tones...
Hum, Chak H
chhum@...
Sep 15, 2005 10:06 am
294
Do you know where i can find a proof for the following statement? Cd the one dimensional cantor set with 0 <d <1/2.Then l(D(Cd))>0 iff d >=1/3.Also in that...
I have a simple qn it would be great if someone cared to answer this why is (0,1)x(0,1/2)x(0,1/3)x(0,1/4)x.........(0,1/n)x........ not(?) an open subset set...
nice to meet you.. you are not mentiond that what topology you considered on R infinity. you have to mention that either box topology or product topology or...
I guess for box topology it is trivially an open set (because the way open sets are defined there ) Why is it true/not true for product topology ? Thanx for...
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