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Reduction of the Gibbs phenomenon for smooth functions with jumps by the -algorithm |
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| Authors: | Bernhard Beckermann Ana C. Matos Franck Wielonsky |
| Affiliation: | aLaboratoire Painlevé UMR 8524, UST Lille, F-59655 Villeneuve d’Ascq CEDEX, France |
| Abstract: | Recently, Brezinski has proposed to use Wynn's ε-algorithm in order to reduce the Gibbs phenomenon for partial Fourier sums of smooth functions with jumps, by displaying very convincing numerical experiments. In the present paper we derive analytic estimates for the error corresponding to a particular class of hypergeometric functions, and obtain the rate of column convergence for such functions, possibly perturbed by another sufficiently differentiable function. We also analyze the connection to Padé–Fourier and Padé–Chebyshev approximants, including those recently studied by Kaber and Maday. |
| Keywords: | Fourier series Gibbs phenomenon Convergence acceleration mml69" > text-decoration:none color:black" href=" /science?_ob=MathURL&_method=retrieve&_udi=B6TYH-4R5F1TJ-3&_mathId=mml69&_user=10&_cdi=5619&_rdoc=3&_acct=C000053510&_version=1&_userid=1524097&md5=68abc13826b2152b2df2439958c1436a" title=" Click to view the MathML source" alt=" Click to view the MathML source" >ε -Algorithm Padé – Fourier approximants Padé – Chebyshev approximants |
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