Abstract
The linear delta expansion technique has been developed for solving the differential equation of motion for symmetric and asymmetric anharmonic oscillators. We have also demonstrated the sophistication and simplicity of this new perturbation technique.
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References
A Okopinsa, Phys. Rev. D35, 1835 (1987)
A Duncan and M Moshe, Phys. Lett. B215, 352 (1988)
A Lindstedt, Mem. de l’Ac. Imper. de St. Petersburg 31, 1883
C M Bender, K A Milton, S S Pinsky and L M Simmous, J. Math. Phys. 30, 7 (1989)
H F Jones, Prepared for Joint International Lepton Symposium at High Energies (15th) and European Physical Society Conference on High-Energy Physics, Geneva, Switzerland, 25 July–1 Aug. 1991
M P Beleneowe and A P Korte, Phys. Rev. B56, 9422 (1997)
J L Kneur, M B Pinto and R O Ramos, Phys. Rev. A68, 043615 (2003)
J L Kneur, M B Pinto and R O Ramos, Phys. Rev. Lett. 89, 210403 (2002)
G Krein, D P Menezes and M B Pinto, Phys. Lett. B370, 5 (1996)
M B Pinto and R O Ramos, Phys. Rev. D60, 105005 (1999)
P Amore and A Aranda, arXiv:math-ph/0303042 (2003)
P Amore Proceedings of the conference: Dynamical systems, Control and Applications (DySCA-I), Mexico City, 3–5 Dic., 2004
P Amore, A Raya and F M Fernandez, Euro. J. Phys. 26, 1057–1063 (2005); arXiv:math-ph/0411061 (2004)
P Amore, F M Fernandez and A Raya, Phys. Lett. A340, 201–208, arXiv:math-ph/0412060 (2004)
D S Mathur, Mechanics (S. Chand and Company Ltd., 2004)
D Chattopadhyay and P C Rakshit, Vibrations, waves, and acoustics (Books and Allied (P) Ltd., 2000)
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Bera, P.K., Datta, J. Linear delta expansion technique for the solution of anharmonic oscillations. Pramana - J Phys 68, 117–122 (2007). https://doi.org/10.1007/s12043-007-0014-8
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DOI: https://doi.org/10.1007/s12043-007-0014-8