A numerical method using Legendre polynomials for solving two-point interface problems

This paper presents a novel numerical algorithm that integrates reproducing kernel functions with Legendre polynomials to effectively address multiple interface problems. We create a new set of bases within the reproducing kernel space, introduce a linear operator, and utilize its properties to deri...

Full description

Saved in:

Bibliographic Details
Published in	AIMS mathematics Vol. 10; no. 4; pp. 7891 - 7905
Main Authors	Wu, Min, Zhou, Jiali, Guan, Chaoyue, Niu, Jing
Format	Journal Article
Language	English
Published	AIMS Press 01.01.2025
Subjects	legendre polynomials linear operator multiple interface problems reproducing kernel method
Online Access	Get full text
ISSN	2473-6988 2473-6988
DOI	10.3934/math.2025362

Cover

More Information
Summary:	This paper presents a novel numerical algorithm that integrates reproducing kernel functions with Legendre polynomials to effectively address multiple interface problems. We create a new set of bases within the reproducing kernel space, introduce a linear operator, and utilize its properties to derive an equivalent operator equation. The model equation is then transformed into a matrix equation, enhancing the solution process for complex interface issues. Comparative numerical examples demonstrate the superior accuracy of our method over conventional approaches. Furthermore, the solution's existence and uniqueness are validated, ensuring the algorithm's reliability and effectiveness.
ISSN:	2473-6988 2473-6988
DOI:	10.3934/math.2025362