NUMERICAL SOLUTION OF THE INVERSE GARDNER EQUATION

In this paper, the numerical solution of the inverse Gardner equation will be considered. The Haar wavelet collocation method (HWCM) will be used to determine the unknown boundary condition which is estimated from an over-specified condition at a boundary. In this regard, we apply the HWCM for discr...

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Vydáno v:TWMS journal of applied and engineering mathematics Ročník 13; číslo 2; s. 649
Hlavní autoři: Foadian, S, Pourgholi, R, Baladezaei, M. G
Médium: Journal Article
Jazyk:angličtina
Vydáno: Istanbul Turkic World Mathematical Society 01.04.2023
Elman Hasanoglu
Témata:
Algorithms
Applied mathematics
Boundary conditions
Collocation methods
Differential equations, Partial
Integral equations
Integrals
Inverse problems
Mathematical research
Numerical analysis
Physics
Quantum field theory
Regularization methods
Iran
ISSN:2146-1147, 2146-1147
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Shrnutí:In this paper, the numerical solution of the inverse Gardner equation will be considered. The Haar wavelet collocation method (HWCM) will be used to determine the unknown boundary condition which is estimated from an over-specified condition at a boundary. In this regard, we apply the HWCM for discretizing the space derivatives and then use a quasilinearization technique to linearize the nonlinear term in the equations. It is proved that the proposed method has the order of convergence O([DELTA]x). The efficiency and robustness of the proposed approach for solving the inverse Gardner equation are demonstrated by one numerical example. Keywords: Haar wavelet, Ill-posed inverse problems, Quasilinearization technique, The Tikhonov regularization method. AMS Subject Classification: 65M32, 65T60.
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ISSN:2146-1147
2146-1147