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JAT
2007

Quasi-interpolation in the Fourier algebra

13 years 11 months ago
Quasi-interpolation in the Fourier algebra
We derive new convergence results for the Schoenberg operator and more general quasi-interpolation operators. In particular, we prove that natural conditions on the generator function imply convergence of these operators in the Fourier algebra A(Rd) = FL1(Rd) and in S0(Rd), a function space developed by the first author and often used in time-frequency analysis. As a simple yet very useful consequence for applications in Gabor analysis we obtain that piecewise linear interpolation converges in A(R) as well as in S0(R). Generally, the results presented in this paper are motivated by discretization problems arising in time-frequency analysis and have important consequences in this field. © 2006 Elsevier Inc. All rights reserved. MSC: Primary 41A15; seconday 42B35, 41A63
Hans Georg Feichtinger, Norbert Kaiblinger
Added 15 Dec 2010
Updated 15 Dec 2010
Type Journal
Year 2007
Where JAT
Authors Hans Georg Feichtinger, Norbert Kaiblinger
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