Laplace transform–homotopy perturbation method with arbitrary initial approximation and residual error cancelation
Autor: | Hector Vazquez-Leal, Mario Gonzalez-Lee, F. Castro-Gonzalez, Arturo Sarmiento-Reyes, Victor Manuel Jimenez-Fernandez, A. Perez-Sesma, D. Pereyra-Diaz, J. Cervantes-Perez, Luis J. Morales-Mendoza, J. Huerta-Chua, Uriel Filobello-Nino |
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Rok vydání: | 2017 |
Předmět: |
Laplace transform
Differential equation Applied Mathematics Mathematical analysis 010103 numerical & computational mathematics Interval (mathematics) Residual 01 natural sciences Square (algebra) 010305 fluids & plasmas Modeling and Simulation Laplace transform applied to differential equations 0103 physical sciences Boundary value problem 0101 mathematics Homotopy analysis method Mathematics |
Zdroj: | Applied Mathematical Modelling. 41:180-194 |
ISSN: | 0307-904X |
DOI: | 10.1016/j.apm.2016.08.003 |
Popis: | This paper presents a modified Laplace transform homotopy perturbation method with finite boundary conditions (MLT–HPM) designed to improve the accuracy of the approximate solutions obtained by LT–HPM and other methods. To this purpose, a suitable initial approximation will be introduced, in addition, the residual error in several points of the interest interval (RECP) will be canceled. In order to prove the efficiency of the proposed method a couple of nonlinear ordinary differential equations with mixed boundary conditions, indeed, difficult to approximate, are proposed. The square residual error (S.R.E) of the proposed solutions will result to be of hundredths and tenths, requiring only a first order approximation of MLT–HPM, unlike LT–HPM, which will require more iterations for the same cases study. |
Databáze: | OpenAIRE |
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