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A STUDY OF THIN PLATE VIBRATION USING HOMOTOPY PERTUBATION ALGORITHM

Yıl 2020, Cilt: 2 Sayı: 2, 92 - 101, 26.06.2020

Öz

In this paper, we apply homotopy perturbation method for the numerical solution of three dimensional second-order partial differential equation which occurred in a plate vibration behaviors. The MAPLE 18 Mathematical software was used to develop a four steps algorithm based on homotopy perturbation method (HPM). Also,we have tested the HPM on the solving of different implementations which show the efficiency and accuracy of the algorithm.The suggested algorithm is quite efficient and practically well suited for use in this problem.Three test cases are considered to verify the reliability and efficiency of the method.The approximated solutions are in good agreement with analytical solutions for the tested problems Moreover, the approximated solutions obtained proved that the proposed method is easy,efficient and accurate.

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Kaynakça

  • [1] Ran Hsu Tai (2018) “Applied Engineering Analysis”, published by John Wiley & Sons, (ISBN 9781119071204) Applied Engineering Analysis pp:71-78.
  • [2] Irvine M, (1981) “Cable Structures”, The MIT Press, Cambridge, New York pp:23-45.
  • [3] Leonard J.W, (1988) “Tension Structures”, McGraw-Hill Book Company, New York.
  • [4] Rega .G, Vestroni F and Benedettini F, (1984) “Parametric analysis of large amplitude free vibrations of a suspended cable”,International Journal of Solids and Structures20(2), pp:95–105.
  • [5] Ni.Y.Q, Lou.W.J and Ko,J.M, (2000) “A hybrid pseudo force/Laplace transform method for non-linear transient response of a suspended cable”, Journal of Sound and Vibration238(2), pp:189–214.
  • [6] He, J.-H. (1999),“Homotopy perturbation technique”,Computer methods in applied mechanics and engineering, 178, 257
  • [7] Vahidi, A., Babolian, E., & Azimzadeh, Z. (2011), “An improvement to the homotopy perturbation method for solving nonlinear Duffing’s equations”, Bulletin of the Malaysian Mathematical Sciences Society pp:23-34
  • [8] Chang, H.-K., & Liou, J.-C. (2006), “Solving wave dispersion equation for dissipative media using homotopy perturbation technique”, Journal of waterway, port, coastal, and ocean engineering, 132.
  • [9] Zhou, S., and Wu, H. (2012) “Analytical solutions of nonlinear Poisson–Boltzmann equation for colloidal particles immersed in a general electrolyte solution by homotopy perturbation technique”, Colloid and Polymer Science, 290, 1165.
  • [10] Özi¸s, T., and Akçı, C. (2011) “Periodic solutions for certain non-smooth oscillators by iterated homotopy perturbation method combined with modified Lindstedt Poincaré technique”, Meccanica, 46, 341.
  • [11] Yazdi, A. A. (2013) “Homotopy perturbation method for nonlinear vibration analysis of functionally graded plate”, Journal of Vibration and Acoustics, 135, 021012. [12] Al-Saif, A. and Abood, D. A. (2011) “The Homotopy Perturbation Method for Solving K (2, 2) Equation”, J, Basrah Researches (Sciences).
  • [13] Aswhad, A. A., & Jaddoa, A. F. (2016) “The Approximate Solution of Newell Whitehead Segel and Fisher Equations Using The Adomian Decomposition Method”, arXiv preprint arXiv:1602.04084.
  • [14] Babolian, E., Azizi, A., & Saeidian, J. (2009) “Some notes on using the homotopy perturbation method for solving time-dependent differential equations”, Mathematical and Computer Modelling, 50, 213.
  • [15] Adil M. Al-Rammahi, and Ghassan A. Al-Juaifri (2017) “A Study of General Second-Order Partial Differential Equations Using Homotopy Perturbation Method”, Global Journal of Pure and Applied Mathematics. ISSN 0973-1768 Volume 13, Number 6, pp. 2471–2492
  • [16] Neamaty, A. and Darzi, R. (2010) “Comparison between the variational iteration method and the homotopy perturbation method for the Sturm-Liouville differential equation”, Boundary Value Problems, 2010, 317369.
  • [17] Chun, C. and Sakthivel, R. (2010) “Homotopy perturbation technique for solving twopoint boundary value problems.comparison with other methods”, Computer Physics Communications, 181, 1021.
  • [18]Liu H.-K,(2011)“Application of homotopy perturbation methods for solving systems of linear equations,”Applied Mathematics and Computation,vol.217,no.12,pp.5259–5264.
  • [19] Ghorbani A. and J. S. Nadjfi (2007) Int. J. Nonlinear Sci. Numer. Simul.8, 229.
Yıl 2020, Cilt: 2 Sayı: 2, 92 - 101, 26.06.2020

Öz

Kaynakça

  • [1] Ran Hsu Tai (2018) “Applied Engineering Analysis”, published by John Wiley & Sons, (ISBN 9781119071204) Applied Engineering Analysis pp:71-78.
  • [2] Irvine M, (1981) “Cable Structures”, The MIT Press, Cambridge, New York pp:23-45.
  • [3] Leonard J.W, (1988) “Tension Structures”, McGraw-Hill Book Company, New York.
  • [4] Rega .G, Vestroni F and Benedettini F, (1984) “Parametric analysis of large amplitude free vibrations of a suspended cable”,International Journal of Solids and Structures20(2), pp:95–105.
  • [5] Ni.Y.Q, Lou.W.J and Ko,J.M, (2000) “A hybrid pseudo force/Laplace transform method for non-linear transient response of a suspended cable”, Journal of Sound and Vibration238(2), pp:189–214.
  • [6] He, J.-H. (1999),“Homotopy perturbation technique”,Computer methods in applied mechanics and engineering, 178, 257
  • [7] Vahidi, A., Babolian, E., & Azimzadeh, Z. (2011), “An improvement to the homotopy perturbation method for solving nonlinear Duffing’s equations”, Bulletin of the Malaysian Mathematical Sciences Society pp:23-34
  • [8] Chang, H.-K., & Liou, J.-C. (2006), “Solving wave dispersion equation for dissipative media using homotopy perturbation technique”, Journal of waterway, port, coastal, and ocean engineering, 132.
  • [9] Zhou, S., and Wu, H. (2012) “Analytical solutions of nonlinear Poisson–Boltzmann equation for colloidal particles immersed in a general electrolyte solution by homotopy perturbation technique”, Colloid and Polymer Science, 290, 1165.
  • [10] Özi¸s, T., and Akçı, C. (2011) “Periodic solutions for certain non-smooth oscillators by iterated homotopy perturbation method combined with modified Lindstedt Poincaré technique”, Meccanica, 46, 341.
  • [11] Yazdi, A. A. (2013) “Homotopy perturbation method for nonlinear vibration analysis of functionally graded plate”, Journal of Vibration and Acoustics, 135, 021012. [12] Al-Saif, A. and Abood, D. A. (2011) “The Homotopy Perturbation Method for Solving K (2, 2) Equation”, J, Basrah Researches (Sciences).
  • [13] Aswhad, A. A., & Jaddoa, A. F. (2016) “The Approximate Solution of Newell Whitehead Segel and Fisher Equations Using The Adomian Decomposition Method”, arXiv preprint arXiv:1602.04084.
  • [14] Babolian, E., Azizi, A., & Saeidian, J. (2009) “Some notes on using the homotopy perturbation method for solving time-dependent differential equations”, Mathematical and Computer Modelling, 50, 213.
  • [15] Adil M. Al-Rammahi, and Ghassan A. Al-Juaifri (2017) “A Study of General Second-Order Partial Differential Equations Using Homotopy Perturbation Method”, Global Journal of Pure and Applied Mathematics. ISSN 0973-1768 Volume 13, Number 6, pp. 2471–2492
  • [16] Neamaty, A. and Darzi, R. (2010) “Comparison between the variational iteration method and the homotopy perturbation method for the Sturm-Liouville differential equation”, Boundary Value Problems, 2010, 317369.
  • [17] Chun, C. and Sakthivel, R. (2010) “Homotopy perturbation technique for solving twopoint boundary value problems.comparison with other methods”, Computer Physics Communications, 181, 1021.
  • [18]Liu H.-K,(2011)“Application of homotopy perturbation methods for solving systems of linear equations,”Applied Mathematics and Computation,vol.217,no.12,pp.5259–5264.
  • [19] Ghorbani A. and J. S. Nadjfi (2007) Int. J. Nonlinear Sci. Numer. Simul.8, 229.
Toplam 18 adet kaynakça vardır.

Ayrıntılar

Birincil Dil İngilizce
Konular Mühendislik
Bölüm Research Articles
Yazarlar

Falade Kazeem Iyanda 0000-0001-7572-5688

Tiamiyu Abd'gafar 0000-0001-7572-5688

Tolufase Emmanuel Bu kişi benim 0000-0001-7572-5688

Yayımlanma Tarihi 26 Haziran 2020
Kabul Tarihi 28 Mayıs 2020
Yayımlandığı Sayı Yıl 2020 Cilt: 2 Sayı: 2

Kaynak Göster

APA Kazeem Iyanda, F., Abd’gafar, T., & Emmanuel, T. (2020). A STUDY OF THIN PLATE VIBRATION USING HOMOTOPY PERTUBATION ALGORITHM. International Journal of Engineering and Innovative Research, 2(2), 92-101.

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