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Sains
Malaysiana 38(5)(2009): 717–721
Direct Solution of Second-order BVPs by
Homotopy-perturbation Method
(Penyelesaian
Secara Langsung MNS Berperingkat-Dua Melalui Kaedah Homotopi-usikan)
O. Abdulaziz1, M.S.H. Chowdhury2, I. Hashim1*
& S. Momani3
1Centre for Modelling & Data Analysis
School of Mathematical
Sciences, Universiti Kebangsaan Malaysia
43600 ¼¯ÃÀÂ鶹 Bangi Selangor D.E., Malaysia
2Faculty of Engineering
International Islamic
University Malaysia
Jalan Gombak, 53100 Kuala
Lumpur, Malaysia
3Department of Mathematics
Mutah University, P.O. Box 7,
Al-Karak, Jordan
Received: 20 June 2008 / Accepted:
20 November 2008
ABSTRACT
In this
paper, systems of second-order boundary value problems (BVPs) are considered. The applicability of the homotopy-perturbation
method (HPM) was extended to obtain exact
solutions of the BVPs directly.
Keywords:
Boundary value problems; homotopy-perturbation method
ABSTRAK
Dalam
makalah ini, sistem masalah nilai sempadan (MNS) berperingkat dua dipertimbangkan. Kegunaan
kaedah homotopi-usikan (KHU) diperluaskan bagi memperoleh penyelesaian tepat MNS tersebut secara langsung.
Kata kunci:
Kaedah homotopi-usikan; masalah nilai sempadan
REFERENCES
Abbasbandy, S. 2007a. A numerical solution of Blasius equation by Adomian’s decomposition
method and comparison with homotopy perturbation method. Chaos
Solitons Fractals 31: 257-260.
Abbasbandy, S. 2007b. Application of
He’s homotopy perturbation method to functional integral equations. Chaos
Solitons Fractals 31: 1243-1247.
Abdulaziz, O., Hashim, I. &
Momani, S. 2008. Application of homotopy-perturbation method
to fractional IVPs. J. Comput. Appl. Math. 216: 574-584.
Abdulaziz,
O., Hashim, I. & Ismail, E.S. 2009. Approximate analytical solution to fractional modified KdV equations. Mathl. Comput. Model. 49: 136-145.
Chen, S.H.,
Hu, J., Chen, L. & Wang, C.P. 2005. Existence results for η-point boundary value problem of second order
ordinary differential equations. J. Comput. Appl. Math. 180: 425-432.
Cheng, X.Y.
& Zhong, C.K. 2005. Existence
of positive solutions for a second order ordinary differential system. J.
Math. Anal. Appl. 312: 14-23.
Chowdhury,
M.S.H. & Hashim, I. 2007a. Solutions of a class of singular second-order IVPs by
homotopy-perturbation method. Phys. Lett. A 365: 439-447.
Chowdhury,
M.S.H. & Hashim, I. 2007b. Solutions
of time-dependent Emden-Fowler type equations by homotopy-perturbation method, Phys.
Lett. A 368: 305-313.
Chowdhury,
M.S.H. & Hashim, I., Abdulaziz, O. 2007. Application of homotopy-perturbation method
to nonlinear population dynamics models. Phys. Lett. A 368:
251-258.
Dehghan, M.
& Saadatmandi, A. 2007. The numerical solution of a nonlinear system of second-order
boundary value problems using the sinc-collocation method, Mathl. Comput. Model. 46:
1434-1441.
Geng, F.Z.
& Cui, M.G. 2007. Solving a
nonlinear system of second order boundary value problems. J. Math. Anal. Appl. 327: 1167-1181.
He, J.H.
1999. Homotopy
perturbation technique, Computer Meth. Appl. Mech. Eng. 178:
257-262.
He, J.H.
2000. A coupling method
of a homotopy technique and a perturbation technique for non-linear problems. Intern. J. Nonlin. Mech. 35: 37-43.
He, J.H.
2006. Homotopy
perturbation method for solving boundary value problems. Phys. Lett.
A 350: 87-88.
Lomtatidze,
A. & Malaguti, L. 2003. On a
two-point boundary value problem for the second order ordinary differential equations
with singularities, Nonlinear Anal. 52: 1553-1567.
Lu, J.F.
2007. Variational
iteration method for solving a nonlinear system of second-order boundary value
problems. Comput. Math. Appl. 54: 1133-1138.
Mawhin, J.
& Tisdell, C. 2003. A note on the uniqueness of
solutions to nonlinear, discrete, vector boundary value problems. Nonlinear Anal. Appl. 1: 789-798.
Odibat,
Z.M. 2007. A new modifcation
of the homotopy perturbation method for linear and nonlinear operators. Appl.
Math. Comput. 189: 746-753.
Saadatmandi,
A., Dehghan, M. & Eftekhari, A. 2009. Application of He’s homotopy perturbation method for non-linear system of
second-order boundary value problems. Nonlin. Analy.: Real World Appl. 10: 1912-1922.
Thompson,
H.B. & Tisdell, C. 2000. Systems of
difference equations associated with boundary value problems for second order
systems of ordinary differential equations. J. Math. Anal. Appl. 248: 333-347.
Thompson,
H.B. & Tisdell, C. 2002. Boundary
value problems for systems of difference equations associated with systems of
second-order ordinary differential equations. Appl. Math. Lett. 15(6): 761-766.
Yusufoglu,
E. 2007. Homotopy
perturbation method for solving a nonlinear system of second order boundary
value problem, Int. J. Nonlin. Sci. Numer. Simul. 8: 353-358.
*Corresponding author; email:
ishak_h@ukm.my
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