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Abstract
In this article, we study bivariate polynomial interpolation on the node points of degenerate Lissajous figures. These node points form Chebyshev lattices of rank 1 and are generalizations of the well-known Padua points. We show that these node points allow unique interpolation in appropriately defined spaces of polynomials and give explicit formulas for the Lagrange basis polynomials. Further, we prove mean and uniform convergence of the interpolating schemes. For the uniform convergence the growth of the Lebesgue constant has to be taken into consideration. It turns out that this growth is of logarithmic nature.
| Original language | English |
|---|---|
| Journal | Applied Mathematics and Computation |
| Volume | 289 |
| Pages (from-to) | 409-425 |
| Number of pages | 17 |
| ISSN | 0096-3003 |
| DOIs | |
| Publication status | Published - 20.10.2016 |
Funding
The author gratefully acknowledges the financial support of the German Research Foundation ( DFG , grant number ER 777/1-1 ). Further, he thanks an anonymous referee for a lot of valuable comments that improved the quality of the article.
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Axially unlimited elongation of a volume-covering sampling trajectory for a novel 3D MPI scanner with cylindrical field-of-view
Buzug, T. (Speaker, Coordinator)
01.08.14 → 31.12.20
Project: DFG Individual Projects