Numerical tests of novel finite difference operator for solving 1D boundary-value problems
Authors:
- Marcin Jaraczewski,
- Tadeusz Sobczyk
Abstract
The finite-difference method is an important approach for solving boundary-value problems of nonlinear ordinary and partial differential equations. In this approach, derivatives and partial derivatives are substituted by discrete finite-difference operators by considering the values at adjacent points, and finite-difference algebraic equations are developed. A large class of discrete operators exists and has been presented in many books on numerical methods. In the present study, an alternative approach to solving boundary-value problems is presented, which can be classified to a group of finite-difference methods.
- Record ID
- CUTd03079579bc3453c9b73b44882295ec8
- Publication categories
- ; ;
- Author
- Pages
- [1-6]
- Other elements of collation
- wykr.; Bibliografia (na s.) - [6]; Bibliografia (liczba pozycji) - 9; Oznaczenie streszczenia - Abstr.
- Book
- WZEE 2019 : 15th Selected Issues of Electrical Engineering and Electronics, Zakopane, Poland, 8-10 December 2019, 2019, [Piscataway], Institute of Electrical and Electronics Engineers, IEEE, [6] p., ISBN 978-1-7281-1038-7 (electronic)
- Keywords in English
- discrete differential operators of periodic functions
- DOI
- DOI:10.1109/WZEE48932.2019.8979825 Opening in a new tab
- URL
- https://ieeexplore.ieee.org/document/8979825 Opening in a new tab
- Language
- eng (en) English
- Score (nominal)
- 20
- Additional fields
- Indeksowana w: Web of Science, Scopus
- Uniform Resource Identifier
- https://cris.pk.edu.pl/info/article/CUTd03079579bc3453c9b73b44882295ec8/
- URN
urn:pkr-prod:CUTd03079579bc3453c9b73b44882295ec8
* presented citation count is obtained through Internet information analysis, and it is close to the number calculated by the Publish or PerishOpening in a new tab system.