Nine-Stage Runge–Kutta–Nyström Pairs Sharing Orders Eight and Six-Reference-Cited by-同舟云学术

Nine-Stage Runge–Kutta–Nyström Pairs Sharing Orders Eight and Six

Published:2024-01-18 Issue:2 Volume:12 Page:316
ISSN:2227-7390
Container-title:Mathematics
language:en
Short-container-title:Mathematics

Author:

Alharbi Hadeel¹,Yadav Kusum¹,Ramadan Rabie A.¹²³^ORCID,Jerbi Houssem⁴^ORCID,Simos Theodore E.⁵⁶⁷⁸⁹^ORCID,Tsitouras Charalampos¹⁰^ORCID

Affiliation:

1. College of Computer Science and Engineering, University of Hail, Ha’il 81481, Saudi Arabia

2. Information Systems Department, College of Economics, Management & Information Systems, Nizwa University, Nizwa 616, Oman

3. Computer Engineering Department, Faculty of Engineering, Cairo University, Giza 12613, Egypt

4. Department of Industrial Engineering, College of Engineering, University of Hail, Ha’il 81481, Saudi Arabia

5. Center for Applied Mathematics and Bioinformatics, Gulf University for Science and Technology, Mubarak Al-Abdullah 32093, Kuwait

6. Laboratory of Inter-Disciplinary Problems of Energy Production, Ulyanovsk State Technical University, 32 Severny Venetz Street, 432027 Ulyanovsk, Russia

7. Department of Medical Research, China Medical University Hospital, China Medical University, Taichung City 40402, Taiwan

8. Data Recovery Key Laboratory of Sichun Province, Neijing Normal University, Neijiang 641100, China

9. Section of Mathematics, Department of Civil Engineering, Democritus University of Thrace, 67100 Xanthi, Greece

10. General Department, National & Kapodistrian University of Athens, Euripus Campus, 34400 Psachna, Greece

Abstract

We explore second-order systems of non-stiff initial-value problems (IVPs), particularly those cases where the first derivatives are absent. These types of problems are of significant interest and have applications in various domains, such as astronomy and physics. Runge–Kutta–Nyström (RKN) pairs stand out as highly effective methods of addressing these IVPs. In order to create a pair with eighth and sixth orders, we need to address a certain known set of equations concerning the coefficients. When constructing such pairs for use in double-precision arithmetic, we often need to meet various conditions. Primarily, we aim to maintain small coefficient magnitudes to prevent a loss of accuracy. Nevertheless, in the context of quadruple precision, we can tolerate larger coefficients. This flexibility enables us to establish pairs with eighth and sixth orders that exhibit significantly reduced truncation errors. Traditionally, these pairs are constructed to go through eight stages per step. Here, we propose using nine stages per step. Then we have available more coefficients in order to further reduce truncation errors. As a result, we construct a novel pair that, as anticipated, achieves superior performance compared to equivalent-order pairs in various significant problem scenarios.

Funder

Research Deanship of Hail University-KSA

Publisher

MDPI AG

Link

https://www.mdpi.com/2227-7390/12/2/316/pdf

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