A Rational Interpolation Scheme with Superpolynomial Rate of Convergence
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The purpose of this study is to construct a high-order interpolation scheme for arbitrary scattered datasets. The resulting function approximation is an interpolation function when the dataset is exact, or a regression if measurement errors are present. We represent each datapoint with a Taylor series, and the approximation error as a combination of the derivatives of the target function. A weighted sum of the square of the coefficient of each derivative term in the approximation error is minimized to obtain the interpolation approximation. The resulting approximation function is a high-order rational function with no poles. When measurement errors are absent, the interpolation approximation converges to the target function faster than any polynomial rate of convergence.
Date issued
2010-01Department
Massachusetts Institute of Technology. Department of Aeronautics and AstronauticsJournal
SIAM Journal on Numerical Analysis
Publisher
Society for Industrial and Applied Mathematics
Citation
Wang, Qiqi, Parviz Moin, and Gianluca Iaccarino. “A Rational Interpolation Scheme with Superpolynomial Rate of Convergence.” SIAM Journal on Numerical Analysis 47.6 (2010): 4073-4097. © 2010 Society for Industrial and Applied Mathematics
Version: Final published version
ISSN
0036-1429
1095-7170
Keywords
rational interpolation, nonlinear regression, function approximation, approximation order