Application of the homotopy perturbation method to the nonlinear pendulum

The homotopy perturbation method is used to solve the nonlinear differential equation that governs the nonlinear oscillations of a simple pendulum, and an approximate expression for its period is obtained. Only one iteration leads to high accuracy of the solutions and the relative error for the approximate period is less than 2% for amplitudes as high as 130°. Another important point is that this method provides an analytical expression for the angular displacement as a function of time as the sum of an infinite number of harmonics; although for practical purposes it is sufficient to consider only a finite number of harmonics. We believe that the present study may be a suitable and fruitful exercise for teaching and better understanding perturbation techniques in advanced undergraduate courses on classical mechanics.

[1]  Ji-Huan He,et al.  Addendum:. New Interpretation of Homotopy Perturbation Method , 2006 .

[2]  Perturbation theory in classical mechanics , 1997 .

[3]  Ji-Huan He SOME ASYMPTOTIC METHODS FOR STRONGLY NONLINEAR EQUATIONS , 2006 .

[4]  L. Fulcher,et al.  Theoretical and Experimental Study of the Motion of the Simple Pendulum. , 1976 .

[5]  S. Liao,et al.  Beyond Perturbation: Introduction to the Homotopy Analysis Method , 2003 .

[6]  Augusto Beléndez,et al.  Analytical approximations for the period of a nonlinear pendulum , 2006 .

[7]  Rajesh R. Parwani,et al.  An approximate expression for the large angle period of a simple pendulum , 2003, physics/0303036.

[8]  An accurate formula for the period of a simple pendulum oscillating beyond the small angle regime , 2005, physics/0510206.

[9]  J. H. Tang,et al.  Solution of a Duffing-harmonic oscillator by the method of harmonic balance , 2006 .

[10]  J. Gillis,et al.  Classical dynamics of particles and systems , 1965 .

[11]  Paolo Amore Francisco M. Fernandez Exact and approximate expressions for the period of anharmonic oscillators , 2004 .

[12]  Ji-Huan He New interpretation of homotopy perturbation method , 2006 .

[13]  Paolo Amore,et al.  Alternative perturbation approaches in classical mechanics , 2004 .

[14]  Alfredo Aranda,et al.  Improved LindstedtPoincar method for the solution of nonlinear problems , 2003, math-ph/0303052.

[15]  Ji-Huan He,et al.  A NEW PERTURBATION TECHNIQUE WHICH IS ALSO VALID FOR LARGE PARAMETERS , 2000 .

[16]  Y. Zarmi,et al.  Weakly nonlinear oscillations: A perturbative approach , 2004 .