On numerical solution of the second-order linear Fredholm–Stieltjes integral equation

Mukhammadmuso Abduzhabbarov; Ramzan Ali; Avyt Asanov

doi:10.1063/5.0050640

AIP Advances (Jul 2021)

On numerical solution of the second-order linear Fredholm–Stieltjes integral equation

Mukhammadmuso Abduzhabbarov,
Ramzan Ali,
Avyt Asanov

Affiliations

Mukhammadmuso Abduzhabbarov: Department of Mathematics and Natural Sciences, School of Arts and Sciences, University of Central Asia, 310 Lenin Street, 722918 Naryn, Kyrgyzstan
Ramzan Ali: Department of Mathematics and Natural Sciences, School of Arts and Sciences, University of Central Asia, 310 Lenin Street, 722918 Naryn, Kyrgyzstan
Avyt Asanov: Department of Mathematics, Kyrgyz-Turkish Manas University, Chyngyz Aitmatov Campus, 720038 Djal, Bishkek, Kyrgyzstan

DOI: https://doi.org/10.1063/5.0050640
Journal volume & issue: Vol. 11, no. 7
pp. 075120 – 075120-6

Abstract

Read online

In this framework, the necessary and sufficient conditions for the existence and uniqueness of the second-order linear Fredholm–Stieltjes-integral equations, u(x)=λ∫abK(x,y)u(y)dg(y)+f(x),x∈a,b, are thoroughly derived. Moreover, instead of approximating the integral equation by different numbers of partition n, the optimal number n for the given error tolerance is established. The system of equations is implemented in MAPLE for the Runge method. An efficient scheme is proposed for second-order integral equations. The solution has been compared with an exact and closed-form solution for limited cases.

Published in AIP Advances

ISSN: 2158-3226 (Online)
Publisher: AIP Publishing LLC
Country of publisher: United States
LCC subjects: Science: Physics
Website: http://aipadvances.aip.org/

About the journal