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Manuscript ID : 514998 Visit : 155 Page: 1 - 12

Article Type: Original Research

Some notes on convergence of homotopy based methods for functional equations

Subject Areas : Applied Mathematics

A Azizi 1 , J Saeidian 2 , E Babolian 3

1 - Department of Mathematics, Payame Noor university, 19395-4697, Tehran, I. R. of Iran.
2 - Faculty of Mathematical Sciences and Computer, Kharazmi University, 599 Taleghani avenue, Tehran 1561836314, Iran.
3 - Faculty of Mathematical Sciences and Computer, Kharazmi University, 599 Taleghani avenue, Tehran 1561836314, Iran.

Received: 2015-09-20 Accepted : 2015-09-20 Published : 2015-12-01

Keywords: Homotopy Analysis Method, Homotopy Perturbation method, Convergence theorem, Banach fixed point theorem, Series solution,

Abstract :

Although homotopy-based methods, namely homotopy analysis method andhomotopy perturbation method, have largely been used to solve functionalequations, there are still serious questions on the convergence issue of thesemethods. Some authors have tried to prove convergence of these methods, butthe researchers in this article indicate that some of those discussions are faulty.Here, after criticizing previous works, a sucient condition for convergence ofhomotopy methods is presented. Finally, examples are given to show that evenif the homotopy method leads to a convergent series, it may not converge tothe exact solution of the equation under consideration.

References:

[1] S.J. Liao, Proposed homotopy analysis technique for the solution
of nonlinear problems, Ph.D. dissertation, Shanghai Jiao Tong
University, (1992).
[2] J.H. He, Homotopy perturbation technique, Comp. Meth. Appl.
Mech. Eng., 178 (1999) 257-262.

[3] S.J. Liao, E. Magyari, Exponentially decaying boundary layers as
limiting cases of families of algebraically decaying ones, ZAMP, 57
(2006) 777-792.
[4] S.J. Liao, A new branch of solutions of boundary-layer ows over
a permeable stretching plate, Int. J. Non-Linear Mech., 42 (2007)
819-830.
[5] S. Abbasbandy, Y. Tan and S.J. Liao, Newton-homotopy analysis
method for nonlinear equations, Appl. Math. Comput., 188 (2007)
1794-1800.
[6] S.J. Liao, On the relationship between the homotopy analysis
method and Euler transform, Commun. Nonlin. Sci. Num. Simul.,
18 (2010) 1421-1431.
[7] S. Abbasbandy, Application of He's homotopy perturbation method
for Laplace transform, Chaos, Solitons and Fractals, 30 (2006) 1206-
1212.
[8] M. A. Rana, A. M. Siddiqui, Q. K. Ghori and R. Qamar, Application
of He's homotopy perturbation method to Sumudu transform, Int.
J. Nonlinear Sci. Numer. Simul., 8 (2008) 185-190.
[9] E. Babolian, J. Saeidian, M. Paripour, Computing the Fourier
Transform via Homotopy Perturbation Method, Z. Naturforsch., A:
Phys. Sci., 64a (2009) 671-675.
[10] E. Babolian, J. Saeidian, New application of HPM for quadratic
riccati di erential equation: a comparative study, Math. Sci. J., 3
(2007)
[11] M. Ghasemi, M. Tavassoli Kajani, A. Azizi, The application of
homotopy perturbation method for solving Schrodinger equation,
Math. Sci. J., 1 (2009)
[12] M. Ghasemi, A. Azizi, M. Fardi, Numerical solution of seven-order
Sawada-Kotara equations by homotopy perturbation method, Math.
Sci. J., 7 (2011) 69-77.
[13] J. Biazar, H. Ghazvini, Convergence of the homotopy perturbation
method for partial di erential equations, Nonlinear Anal. Real
World Appl., 10 (2009) 2633-2640.

[14] J. Biazar, H. Aminikhah, Study of convergence of homotopy
perturbation method for systems of partial di erential equations,
Comput. Math. Appl., 58 (2009) 2221-2230.
[15] Z. Odibat, A study on the convergence of homotopy analysis
method, Appl. Math. Comput., 217 (2010) 782-789.
[16] S.J. Liao, Beyond Perturbation: An Introduction to Homotopy
Analysis Method, Chapman Hall/CRC Press, Boca Raton, 2003.
[17] S.J. Liao, Y. Tan, A general approach to obtain series solutions of
nonlinear di erential equations, Stud. Appl. Math., 119 (2007) 297-
354.
[18] E. Babolian, A. Azizi, J. Saeidian, Some notes on using
the homotopy perturbation method for solving time-dependent
di erential equations, Math. Comput. Model., 50 (2009) 213-224.

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