Title of article
Optimal adaptive computations in the Jaffard algebra and localized frames Original Research Article
Author/Authors
Stephan Dahlke، نويسنده , , Massimo Fornasier، نويسنده , , Karlheinz Gr?chenig، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2010
Pages
33
From page
153
To page
185
Abstract
We study the numerical solution of infinite matrix equations View the MathML sourceAu=f for a matrix View the MathML sourceA in the Jaffard algebra. These matrices appear naturally via frame discretizations in many applications such as Gabor analysis, sampling theory, and quasi-diagonalization of pseudo-differential operators in the weighted Sjöstrand class. The proposed algorithm has two main features: firstly, it converges to the solution with quasi-optimal order and complexity with respect to classes of localized vectors; secondly, in addition to ℓ2ℓ2-convergence, the algorithm converges automatically in some stronger norms of weighted ℓpℓp-spaces. As an application we approximate the canonical dual frame of a localized frame and show that this approximation is again a frame, and even an atomic decomposition for a class of associated Banach spaces. The main tools are taken from adaptive algorithms, from the theory of localized frames, and the special Banach algebra properties of the Jaffard algebra.
Keywords
Adaptive scheme , Jaffard algebra , Frames in Banach spaces , best approximation , Localization of frames , Sparse matrix
Journal title
Journal of Approximation Theory
Serial Year
2010
Journal title
Journal of Approximation Theory
Record number
852739
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