Solving nth-order integro-differential equations by novel generalized hybrid transform

被引：1

作者：

Khan, Sana Ullah ^{[1
]}

Khan, Asif ^{[1
]}

Ullah, Aman ^{[1
]}

Ahmad, Shabir ^{[1
]}

Awwad, Fuad A. ^{[2
]}

Ismail, Emad A. A. ^{[2
]}

Maitama, Shehu ^{[3
]}

Umar, Huzaifa ^{[4
]}

Ahmad, Hijaz ^{[4
,5
,6
]}

机构：

[1] Univ Malakand, Dept Math, Khyber Pakhtunkhwa, Pakistan

[2] King Saud Univ, Dept Quantitat Anal, Coll Business Adm, POB 71115, Riyadh 11587, Saudi Arabia

[3] Shandong Univ, Sch Math, Jinan, Shandong, Peoples R China

[4] Near East Univ, Operat Res Ctr Healthcare, TRNC Mersin 10, TR-99138 Nicosia, Turkiye

[5] Lebanese Amer Univ, Dept Comp Sci & Math, Beirut, Lebanon

[6] Int Telemat Univ Uninettuno, Sect Math, Corso Vittorio Emanuele II 39, I-00186 Rome, Italy

来源：

EUROPEAN JOURNAL OF PURE AND APPLIED MATHEMATICS | 2023年 / 16卷 / 03期

关键词：

Integro-differential equations; Shehu transform; Integral transforms; DIFFERENTIAL-EQUATIONS; NUMERICAL-SOLUTION; PHYSICS;

D O I：

10.29020/nybg.ejpam.v16i3.4840

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

Recently, Shehu has introduced an integral transform called Shehu transform, which generalizes the two well-known integrals transforms, i.e. Laplace and Sumudu transform. In the literature, many integral transforms were used to compute the solution of integro-differential equations (IDEs). In this article, for the first time, we use Shehu transform for the computation of solution of n(th)-order IDEs. We present a general scheme of solution for n(th)-order IDEs. We give some examples with detailed solutions to show the appropriateness of the method. We present the accuracy, simplicity, and convergence of the proposed method through tables and graphs.

引用

页码：1940 / 1955

页数：16

共 50 条

[1] Application of the variational iteration method for solving nth-order integro-differential equations
Shang, Xufeng
Han, Danfu
[J]. JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS, 2010, 234 (05) : 1442 - 1447
[2] Existence of solutions for nth-order integro-differential equations in Banach spaces
Guo, DJ
[J]. COMPUTERS & MATHEMATICS WITH APPLICATIONS, 2001, 41 (5-6) : 597 - 606
[3] IDSOLVER: A general purpose solver for nth-order integro-differential equations
Gelmi, Claudio A.
Jorquera, Hector
[J]. COMPUTER PHYSICS COMMUNICATIONS, 2014, 185 (01) : 392 - 397
[4] Application of Variational Iteration Method for nth-Order Integro-Differential Equations
Abbasbandy, Said
Shivanian, Elyas
[J]. ZEITSCHRIFT FUR NATURFORSCHUNG SECTION A-A JOURNAL OF PHYSICAL SCIENCES, 2009, 64 (7-8): : 439 - 444
[5] Numerical solution of nth-order integro-differential equations using trigonometric wavelets
Lakestani, Mehrdad
Jokar, Mahmood
Dehghan, Mehdi
[J]. MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2011, 34 (11) : 1317 - 1329
[6] Multiple positive solutions for nth-order impulsive integro-differential equations in Banach spaces
Guo, DJ
[J]. NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS, 2005, 60 (05) : 955 - 976
[7] Application of He's homotopy perturbation method for nth-order integro-differential equations
Golbabai, A.
Javidi, M.
[J]. APPLIED MATHEMATICS AND COMPUTATION, 2007, 190 (02) : 1409 - 1416
[8] Generalized Differential Transform Method for Solving Some Fractional Integro-Differential Equations
Shahmorad, S.
Khajehnasiri, A. A.
[J]. APPLICATIONS AND APPLIED MATHEMATICS-AN INTERNATIONAL JOURNAL, 2019, 14 (01): : 211 - 222
[9] Numerical solution of the general Volterra nth-order integro-differential equations via variational iteration method
Khaireddine, Fernane
[J]. ASIAN-EUROPEAN JOURNAL OF MATHEMATICS, 2020, 13 (02)
[10] Infinite boundary value problems for nth-order nonlinear impulsive integro-differential equations in Banach spaces
Liu, Lishan
Liu, Zhenbin
Wu, Yongliong
[J]. NONLINEAR ANALYSIS-THEORY METHODS & APPLICATIONS, 2007, 67 (09) : 2670 - 2679

← 1 2 3 4 5 →