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OPTIMAL HOMOTOPY ASYMPTOTIC METHOD TO SOLUTION OF PARTIAL DIFFERENTIAL EQUATIONS

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dc.contributor.author NAWAZ, RASHID
dc.date.accessioned 2017-12-13T08:48:05Z
dc.date.accessioned 2020-04-14T19:23:40Z
dc.date.available 2020-04-14T19:23:40Z
dc.date.issued 2014
dc.identifier.uri http://142.54.178.187:9060/xmlui/handle/123456789/7387
dc.description.abstract Nonlinear Differential equations are of major importance in different fields of science and engineering. For complicated nonlinear problems exact solutions are not available and alternate way is to use numerical methods, Iterative methods or analytical techniques of perturbation. Numerical methods use discretization a have slow rate of convergence. Iterative methods are sensitive to initial conditions and in case of high nonlinearity they do not yield converged results. In perturbation methods small parameter is applied on the equation and hence cannot be applied for high nonlinear problems as they do not have small parameter. One of domain type methods is known as OHAM. This method is free from small parameter assumption and do not need the initial guess. The proposed method provides better accuracy at lower-order of approximations. Moreover the convergence domain can be easily adjusted. In this thesis OHAM is implemented for solution linear and nonlinear tenth order ODEs. Then its effectiveness and generalization is shown to a nonlinear family of PDEs, including Burger, Fisher, Burger’s–Huxley, Burger’s–Fisher, MEW and DGRLW equations. The results of the proposed method are compared with that of DTM, VIM, ADM, HAM and HPM, which reveal that OHAM is effective, simpler, easier and explicit. Apart from application to PDEs, OHAM is applied to couple system of PDEs. The coupled WBK, ALW, MB systems are used as test examples and results are compared with those obtained by HPM. OHAM is implemented to DDEs as well, and solution of MKdV lattice equation is presented for the illustration of proposed technique. The results are compared with HAM and HPM. In all cases the results obtained by OHAM are in close agreement with the exact solution and reveal high accuracy. en_US
dc.description.sponsorship Higher Education Commission, Pakistan en_US
dc.language.iso en en_US
dc.publisher PESHAWAR (CHARTERED UNIVERSITY), KHYBER PAKHTUNKHAWA, PAKISTAN en_US
dc.subject Natural Sciences en_US
dc.title OPTIMAL HOMOTOPY ASYMPTOTIC METHOD TO SOLUTION OF PARTIAL DIFFERENTIAL EQUATIONS en_US
dc.type Thesis en_US


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