Smooth Molecular Decompositions of Functions and Singular Integral Operators Book

$Smooth Molecular Decompositions of Functions and Singular Integral Operators, Under minimal assumptions on a function $\psi$ we obtain wavelet-type frames of the form $$\psi_{j,k}(x) = r^{(1/2)n j} \psi(r^j x - sk), \qquad j \in \mathbb{Z}, k \in \mathbb{Z}^n,$$ for some $r > 1$ and $s > 0$. This collection is shown to be a f, Smooth Molecular Decompositions of Functions and Singular Integral Operators has a rating of 3 stars$

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Smooth Molecular Decompositions of Functions and Singular Integral Operators, Under minimal assumptions on a function $\psi$ we obtain wavelet-type frames of the form $$\psi_{j,k}(x) = r^{(1/2)n j} \psi(r^j x - sk), \qquad j \in \mathbb{Z}, k \in \mathbb{Z}^n,$$ for some $r > 1$ and $s > 0$. This collection is shown to be a f, Smooth Molecular Decompositions of Functions and Singular Integral Operators

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Smooth Molecular Decompositions of Functions and Singular Integral Operators
Written by author John E. Gilbert
Published by American Mathematical Society, February 2002
Under minimal assumptions on a function $psi$ we obtain wavelet-type frames of the form $$psi_{j,k}(x) = r^{(1/2)n j} psi(r^j x - sk), qquad j in mathbb{Z}, k in mathbb{Z}^n,$$ for some $r > 1$ and $s > 0$. This collection is shown to be a f

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Under minimal assumptions on a function $psi$ we obtain wavelet-type frames of the form $$psi_{j,k}(x) = r^{(1/2)n j} psi(r^j x - sk), qquad j in mathbb{Z}, k in mathbb{Z}^n,$$ for some $r > 1$ and $s > 0$. This collection is shown to be a frame for a scale of Triebel-Lizorkin spaces (which includes Lebesgue, Sobolev and Hardy spaces) and the reproducing formula converges in norm as well as pointwise a.e. The construction follows from a characterization of those operators which are bounded on a space of smooth molecules. This characterization also allows us to decompose a broad range of singular integral operators in terms of smooth molecules.

Title: Smooth Molecular Decompositions of Functions and Singular Integral Operators

Item Number: 9780821827727

Publication Date: February 2002

Number: 1

Product Description: Smooth Molecular Decompositions of Functions and Singular Integral Operators

Universal Product Code (UPC): 9780821827727

WonderClub Stock Keeping Unit (WSKU): 9780821827727

Rating: 3/5 based on 2 Reviews

Image Location: https://wonderclub.com/images/covers/77/27/9780821827727.jpg

Category: Media >> Books

Weight: 0.200 kg (0.44 lbs)

Width: 0.000 cm (0.00 inches)

Heigh : 0.000 cm (0.00 inches)

Depth: 0.000 cm (0.00 inches)

Date Added: August 25, 2020, Added By: Ross

Date Last Edited: August 25, 2020, Edited By: Ross

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$99.99	Digital	Arrives between May 9 - Jun 8 Login to your account for a direct download. Some files are emailed from Dropbox. Continent $0.00 - World $0.00	WonderClub $Smooth Molecular Decompositions of Functions and Singular Integral Operators, Under minimal assumptions on a function $\psi$ we obtain wavelet-type frames of the form $$\psi_{j,k}(x) = r^{(1/2)n j} \psi(r^j x - sk), \qquad j \in \mathbb{Z}, k \in \mathbb{Z}^n,$$ for some $r > 1$ and $s > 0$. This collection is shown to be a f, Smooth Molecular Decompositions of Functions and Singular Integral Operators has a rating of 4.9956970740103 stars$ (9296 total ratings)

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$3 Stars Rating for Smooth Molecular Decompositions of Functions and Singular Integral Operators, Under minimal assumptions on a function $\psi$ we obtain wavelet-type frames of the form $$\psi_{j,k}(x) = r^{(1/2)n j} \psi(r^j x - sk), \qquad j \in \mathbb{Z}, k \in \mathbb{Z}^n,$$ for some $r > 1$ and $s > 0$. This collection is shown to be a f, Smooth Molecular Decompositions of Functions and Singular Integral Operators$ Smooth Molecular Decompositions of Functions and Singular Integral Operators

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Add Smooth Molecular Decompositions of Functions and Singular Integral Operators, Under minimal assumptions on a function $\psi$ we obtain wavelet-type frames of the form $$\psi_{j,k}(x) = r^{(1/2)n j} \psi(r^j x - sk), \qquad j \in \mathbb{Z}, k \in \mathbb{Z}^n,$$ for some $r > 1$ and $s > 0$. This collection is shown to be a f, Smooth Molecular Decompositions of Functions and Singular Integral Operators to the inventory that you are selling on WonderClub

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