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Multilevel quasi-interpolation

Title data

Franz, Tino ; Wendland, Holger:
Multilevel quasi-interpolation.
In: IMA Journal of Numerical Analysis. Vol. 43 (2023) . - pp. 2934-2964.
ISSN 1464-3642
DOI: https://doi.org/10.1093/imanum/drac059

Abstract in another language

Quasi-interpolation methods are well-established tools in multivariate approximation. They are efficient as they do not require, in contrast to interpolation, the solution of a linear system. Quasi-interpolations are often first studied on infinite grids. Here, it is usually required that the quasi-interpolation operator reproduces polynomials of a certain degree exactly. This degree corresponds to the approximation order of the quasi-interpolation process. Unfortunately, if a radial, compactly supported kernel is employed for building the quasi-interpolation operator, it is well known that polynomial reproduction is impossible in two or more dimensions. As such operators are numerically appealing and are frequently used in particle methods, we will, in this paper, look at such quasi-interpolation operators that do not reproduce polynomials and show that they lead, when employed in a multilevel scheme, to an efficient and converging approximation method.

Further data

Item Type: Article in a journal
Refereed: Yes
Institutions of the University: Faculties > Faculty of Mathematics, Physics und Computer Science > Department of Mathematics > Chair Mathematics III (Applied and Numerical Analysis) > Chair Mathematics III (Applied and Numerical Analysis) - Univ.-Prof. Dr. Holger Wendland
Result of work at the UBT: Yes
DDC Subjects: 500 Science > 510 Mathematics
Date Deposited: 06 Mar 2024 08:34
Last Modified: 06 Mar 2024 08:34
URI: https://eref.uni-bayreuth.de/id/eprint/88800