An effective approximation for singularly perturbed problem with multi-point boundary value

According to some references, existence and uniqueness of nonlocal problems can be seen in [1,4,22]. [...]We formulate the iterative algorithm for solving the discrete problem and a numerical example present to find the solution of approximation in Section 5. [...]we will integrate the Equation (1)...

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Veröffentlicht in:New trends in mathematical sciences Jg. 9; H. 2; S. 15 - 25
1. Verfasser: Arslan, Derya
Format: Journal Article
Sprache:Englisch
Veröffentlicht: Istanbul Yildiz Technical University, Faculty of Chemistry and Metallurgy 18.04.2021
Schlagworte:
Algorithms
Approximation
Basis functions
Boundary conditions
Boundary value problems
Control theory
Estimates
Exact solutions
Finite difference method
Iterative algorithms
Iterative methods
Mathematical analysis
Methods
Numerical analysis
ISSN:2147-5520, 2147-5520
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Zusammenfassung:According to some references, existence and uniqueness of nonlocal problems can be seen in [1,4,22]. [...]We formulate the iterative algorithm for solving the discrete problem and a numerical example present to find the solution of approximation in Section 5. [...]we will integrate the Equation (1) over (x,_i,xi+i), here {(?i{x)}=i is the basis functions that {(Pi{x)}=i has the following form where ji = y -f', <P; (x) and '(x), respectively, are the solution of the problems as: [...]the following uniform error estimate satisfies 5 Algorithm and numerical results Here an effective algorithm has been given for the solution of the difference scheme (16)-(18) and numerical results have also been displayed in table and graphs. (a) We give the algorithm for the solution of the difference scheme (16)-(18): (b) We examine the following problem to see how the method works: where We have the exact solution of this problem as The corresponding e- uniform convergence rates are computed using the formula The error estimates are denoted by 6 Conclusion In this study, we have offered an effective finite difference method for solving second-order linear singularly perturbed multi-point boundary value problem.
Bibliographie:ObjectType-Article-1
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ISSN:2147-5520
2147-5520
DOI:10.20852/ntmsci.2021.416