Numerical solutions of two-point fuzzy boundary value problem using half-sweep alternating group explicit method

Dahalan, A. A.; Muthuvalu, Mohana Sundaram; Sulaiman, Jumat

doi:10.1063/1.4823884

Cited by 10 publications

(5 citation statements)

References 14 publications

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“…Therefore, the combination of the KSOR block technique with the standard EG iterative method can reduce iteration and Time compared to the KSOR point approach. For further study, this paper can be extended to perform the use of the newly established RKFD discretization scheme for solving the multi-dimensional boundary value problems by using the twostep iteration family [43,44], and the half-sweep [45,46] and quarter-sweep [47,48] iteration families.…”

Section: Discussionmentioning

confidence: 99%

Redlich-Kister Finite Difference Solution for Solving Two-Point Boundary Value Problems by using Ksor Iteration Family

Suardi¹,

Sulaiman²

2021

Adv. sci. technol. eng. syst. j.

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In this paper, we are concerned to investigate the efficiency of the second-order Redlich-Kister Finite Difference (RKFD) discretization scheme together with the Four Point Explicit Group Kaudd Successive Over Relaxation (4EGKSOR) iterative method for solving twopoint boundary value problems (TPBVPs). In order to apply this block iteration to solve any linear system, firstly we discretize all derivative terms via the second-order RKFD discretization scheme over the proposed problem in order to get the second-order RKFD approximation equation. Due to the main characteristics of the coefficient matrix for the generated linear system which are large-scale and sparse, the best choice for solving this linear system is using one of the iterative methods. Therefore, the formulation of the Kaudd Successive Over Relaxation method together with the Explicit Group iteration method mainly on the Four-Point Explicit Group Kaudd Successive Over Relaxation (4EGKSOR) iterative method has been presented to solve this linear system iteratively. In order to show the efficiency of the 4EGKSOR, another two iterative methods have also been considered which are the Gauss-Seidel (GS) and the Kaudd Successive Over Relaxation (KSOR) to solve three examples of the proposed problems in which all numerical results obtained were recorded based on the number of iterations, execution time and maximum norm. Based on the performance analysis, clearly, the 4EGKSOR iterative method shows substantiated improvement in terms of the number of iterations and execution time.

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Section: Discussionmentioning

confidence: 99%

Redlich-Kister Finite Difference Solution for Solving Two-Point Boundary Value Problems by using Ksor Iteration Family

Suardi¹,

Sulaiman²

2021

Adv. sci. technol. eng. syst. j.

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“…Basically the results of this paper can be classified as one of full-sweep iteration. Apart from the concept of the full-sweep iteration, further investigation of half-sweep [19][20][21][22][23][24] and quarter-sweep [25][26][27] iterations can also be considered in order to speed up the convergence rate of the standard proposed iterative methods.…”

Section: Discussionmentioning

confidence: 99%

Implementation of TAGE Method Using Seikkala Derivatives Applied to Two-Point Fuzzy Boundary Value Problems

Dahalan

Sulaiman

2015

International Journal of Differential Equations

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Iterative methods particularly the Two-Parameter Alternating Group Explicit (TAGE) methods are used to solve system of linear equations generated from the discretization of two-point fuzzy boundary value problems (FBVPs). The formulation and implementation of the TAGE method are also presented. Then numerical experiments are carried out onto two example problems to verify the effectiveness of the method. The results show that TAGE method is superior compared to GS method in the aspect of number of iterations, execution time, and Hausdorff distance.

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“…The above system (14) can be written in the form of a linear system of equations AX ¼ B as follows: We may write Eqs. (19) and 20as the following system is obtained:…”

Section: Proposed Methodsmentioning

confidence: 99%

“…Undetermined fuzzy coefficients method has been applied by Guo et al [18] to obtain the solution of SOFBVPs. Dahalan et al [19] implemented half-sweep alternating group explicit method to obtain the numerical solution. Optimal homotopy asymptotic method (OHAM) has been applied by Jameel and Ismail [20] to solve nth order two-point FBVPs.…”

Section: Introductionmentioning

confidence: 99%

Numerical solution of fuzzy boundary value problems using Galerkin method

2017

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This paper proposes a new technique based on Galerkin method for solving nth order fuzzy boundary value problem. The proposed method has been illustrated by considering three different cases depending upon the sign of coefficients with benchmark example problems. To show the applicability of the proposed method, an application problem related to heat conduction has also been studied. The results obtained by the proposed methods are compared with the exact solution and other existing methods for demonstrating the validity and efficiency of the present method.

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Numerical solutions of two-point fuzzy boundary value problem using half-sweep alternating group explicit method

Cited by 10 publications

References 14 publications

Redlich-Kister Finite Difference Solution for Solving Two-Point Boundary Value Problems by using Ksor Iteration Family

Redlich-Kister Finite Difference Solution for Solving Two-Point Boundary Value Problems by using Ksor Iteration Family

Implementation of TAGE Method Using Seikkala Derivatives Applied to Two-Point Fuzzy Boundary Value Problems

Numerical solution of fuzzy boundary value problems using Galerkin method

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