Regular ArticleFree Access

AN EFFICIENT APPROACH FOR SOLVING THE FRACTAL, DAMPED CUBIC–QUINTIC DUFFING’S EQUATION

Mechanical Engineering and Advanced Materials Department, Institute of Advanced Materials for Sustainable Manufacturing, Ave. Eugenio Garza Sada 2501, Monterrey 64849, Mexico

E-mail Address: aelias@tec.mx

Corresponding author.

Search for more papers by this author

OSCAR MARTÍNEZ-ROMERO

https://orcid.org/0000-0002-3837-2083

Mechanical Engineering and Advanced Materials Department, Institute of Advanced Materials for Sustainable Manufacturing, Ave. Eugenio Garza Sada 2501, Monterrey 64849, Mexico

E-mail Address: oscar.martinez@tec.mx

Search for more papers by this author

DANIEL OLVERA TREJO

https://orcid.org/0000-0002-4385-6269

Mechanical Engineering and Advanced Materials Department, Institute of Advanced Materials for Sustainable Manufacturing, Ave. Eugenio Garza Sada 2501, Monterrey 64849, Mexico

E-mail Address: daniel.olvera-trejo@tec.mx

Search for more papers by this author

, and

LUIS MANUEL PALACIOS-PINEDA

https://orcid.org/0000-0001-5297-2950

Mechanical Engineering and Advanced Materials Department, Institute of Advanced Materials for Sustainable Manufacturing, Ave. Eugenio Garza Sada 2501, Monterrey 64849, Mexico

E-mail Address: luis.pp@pachuca.tecnm.mx

Current address: Tecnológico Nacional de México/Instituto Tecnológico de Pachuca, Carr. México-Pachuca Km 87.5, Pachuca, Hidalgo, Código Postal 42080, Mexico.

Search for more papers by this author

https://doi.org/10.1142/S0218348X24500117Cited by:1 (Source: Crossref)

Abstract

The main goal of this work is to focus on using He’s two-scale fractal dimension transform, the Caputo–Fabrizio fractional-order derivative, and the harmonic balance and the homotopy methods are applied for deriving the approximate solution of the fractal, damped cubic–quintic Duffing’s equation when the fractional derivative order of the inertia term is not twice of that of the damping term. Numerical results obtained from the derived expressions and the numerical integration solution show good agreement, especially at small values of the nonlinear parameters. Furthermore, when the fractal order of the damping term decreases, the damping oscillation frequency values increase with a decrease in the system wavelength values, which indicates a slower decay in the system oscillation amplitudes. Our solution procedures elucidate the applicability of He’s two-scale fractal dimension transform for solving nonlinear dynamic systems with inertia and damping fractal terms.

Keywords:

References

1. S. Lenci, G. Menditto and A. M. Tarantino , Homoclinic and heteroclinic bifurcations in the non-linear dynamics of a beam resting on an elastic substrate, Int. J. Nonlinear Mech. 34 (1999) 615–632. Crossref, Web of Science, Google Scholar
2. S. Jeyakumari, V. Chinnathambi, S. Rajasekar and M. A. F. Sanjuan , Analysis of vibrational resonance in a quintic oscillator, Chaos 19 (2009) 043128. Crossref, Web of Science, Google Scholar
3. H. M. Sedighi, K. H. Shirazi and J. Zare , An analytic solution of transversal oscillation of quintic non-linear beam with homotopy analysis method, Int. J. Nonlinear Mech. 47 (2012) 777–784. Crossref, Web of Science, Google Scholar
4. M. O. Oyesanya and J. I. Nwamba , Stability analysis of damped cubic–quintic Duffing oscillator, World J. Mech. 3 (2013) 43–57. Crossref, Google Scholar
5. A. Elías-Zúñiga , Exact solution of the cubic–quintic Duffing oscillator, Appl. Math. Model. 37 (4) (2013) 2574–2579. Crossref, Web of Science, Google Scholar
6. A. Elías-Zúñiga , Solution of the damped cubic–quintic Duffing oscillator by using Jacobi elliptic functions, Appl. Math. Comput. 246 (2014) 474–481. Web of Science, Google Scholar
7. V. A. Kim , Duffing oscillator with external harmonic action and variable fractional Riemann–Liouville derivative characterizing viscous friction, Bulletin KRASEC. Phys. Math. Sci. 13(2) (2016) 46–49. Google Scholar
8. Y. Qin, Z. Wang and L. Zou , Dynamics of nonlinear transversely vibrating beams: Parametric and closed-form solutions, Appl. Math. Model. 88 (2020) 676–687. Crossref, Web of Science, Google Scholar
9. S. C. Eze , Analysis of fractional Duffing oscillator, Rev. Mex. Fis. 66(2) (2020) 187–191. Crossref, Web of Science, Google Scholar
10. A. Elías-Zúñiga, L. M. Palacios-Pineda, S. Puma-Araujo, O. Martínez-Romero and D. Olvera-Trejo , A power-form method for dynamic systems: Investigating the steady-state response of strongly nonlinear oscillators by their equivalent Duffing-type equation, Nonlinear Dynam. 104 (2021) 3065–3075. Crossref, Web of Science, Google Scholar
11. A. Elías-Zúñiga, L. M. Palacios-Pineda, I. H. Jiménez-Cedeño and O. Martínez-Romero , Analytical solution of the fractal cubic–quintic Duffing equation, Fractals 29(04) (2021) 2150080. Link, Web of Science, Google Scholar
12. A. I. Maimistov , Propagation of an ultimately short electromagnetic pulse in a nonlinear medium described by the fifth-order Duffing model, Opt. Spectrosc. 94(2) (2003) 251–257. Crossref, Web of Science, Google Scholar
13. M. Taylan , The effect of nonlinear damping and restoring in ship rolling, Ocean Eng. 27 (2000) 921–932. Crossref, Web of Science, Google Scholar
14. J. M. Wang , Traveling wave of a cosh-Gaussian laser beam in both Kerr and cubic quintic nonlinear media based on Mathematica, Chin. Phys. Lett. 28(3) (2011) 030202. Crossref, Web of Science, Google Scholar
15. N. D. Ugochukwu, M. F. Oguagbaka, E. S. Samuel, N. S. Aguegboh and O. N. Ebube , On the stability of Duffing type fractional differential equation with cubic nonlinearity, Open Access Libr. J. 7 (2020) e6184. Google Scholar
16. A. Elías-Zúñiga , “ Quintication” method to obtain approximate analytical solutions of non-linear oscillators, Appl. Math. Comput. 243 (2014) 849–855. Crossref, Web of Science, Google Scholar
17. C.-H. He, D. Tian, G. M. Moatimid, H. F. Salman and M. H. Zekry , Hybrid Rayleigh–van der Pol–Duffing oscillator: Stability analysis and controller, J. Low Freq. Noise Vib. Act. Control 41 (1) (2022) 244–268. Crossref, Web of Science, Google Scholar
18. A. Elías-Zúñiga, L. M. Palacios-Pineda, I. H. Jiménez-Cedeño, O. Martínez-Romero and D. Olvera-Trejo , Fractal model for current generation in porous electrodes, J. Electroanal. Chem. 880 (2021) 114883. Crossref, Web of Science, Google Scholar
19. C.-H. He and C. Liu , A modified frequency-amplitude formulation for fractal vibration systems, Fractals 30(3) (2022) 2250046. Link, Web of Science, Google Scholar
20. T. L. M. Djomo Mbong, M. Siewe Siewe and C. Tchawoua , The effect of the fractional derivative order on vibrational resonance in a special fractional quintic oscillator, Mech. Res. Comm. 78(Part A) (2016) 13–19. Crossref, Web of Science, Google Scholar
21. Y. Zhi, W. Wei and L. Xianbin , Analysis of a quintic system with fractional damping in the presence of vibrational resonance, Appl. Math. Comput. 321(15) (2018) 780–793. Google Scholar
22. W. Guo and L. Ning , Vibrational resonance in a fractional order quintic oscillator system with time delay feedback, Internat. J. Bifur. Chaos 30(2) (2020) 2050025. Link, Web of Science, Google Scholar
23. P. Pirmohabbati, A. H. Refahi Sheikhani, H. S. Najafi and A. A. Ziabari , Numerical solution of full fractional Duffing equations with cubic–quintic–heptic nonlinearities, AIMS Math. 5(2) (2020) 1621–1641. Crossref, Web of Science, Google Scholar
24. Q. T. Ain and J.-H. He , On two-scale dimension and its applications, Therm. Sci. 23 (2019) 1707–1712. Crossref, Web of Science, Google Scholar
25. J. H. He and F. Y. Ji , Two-scale mathematics and fractional calculus for thermodynamics, Therm. Sci. 23(4) (2019) 2131–2133. Crossref, Web of Science, Google Scholar
26. J. H. He, N. Qie and C. H. He , Solitary waves travelling along an unsmooth boundary, Results Phys. 24 (2021) 104104. Crossref, Web of Science, Google Scholar
27. M. Y. Qian and J.-H. He , Two-scale thermal science for modern life: Making the impossible possible, Therm. Sci. 26(3B) (2022) 2409–2412. Crossref, Web of Science, Google Scholar
28. A. Elías-Zúñiga, L. M. Palacios-Pineda, I. H. Jiménez-Cedeño, O. Martínez-Romero and D. Olvera-Trejo , Equivalent power-form representation of the fractal Toda oscillator, Fractals 29(2) (2021) 2150034. Link, Web of Science, Google Scholar
29. K. Wang , He’s frequency formulation for fractal nonlinear oscillator arising in a microgravity space, Numer. Methods Partial Differential Equation 37 (2020) 1374–1384. Crossref, Web of Science, Google Scholar
30. K. Wang and S. W. Yao , Fractal variational theory for Chaplygin–He gas in a microgravity condition, J. Appl. Comput. Mech. 7(1) (2021) 182–188. Web of Science, Google Scholar
31. J. H. He , A fractal variational theory for one-dimensional compressible flow in a microgravity space, Fractals 28 (2020) 2050024. Link, Web of Science, Google Scholar
32. A. Elías-Zúñiga, O. Martínez-Romero, D. Olvera-Trejo and L. M. Palacios-Pineda , An efficient ancient Chinese algorithm to investigate the dynamics response of a fractal microgravity forced oscillator, Fractals 29(6) (2021) 2150144. Link, Web of Science, Google Scholar
33. N. Anjun, C. H. He and J.-H. He , Two-scale fractal theory for the population dynamics, Fractals 29(7) (2021) 2150182. Link, Web of Science, Google Scholar
34. A. Elías-Zúñiga, O. Martínez-Romero, D. Olvera-Trejo and L. M. Palacias-Pineda , Fractal equation of motion of a non-Gaussian polymer chain: Investigating its dynamic fractal response using an ancient Chinese algorithm, J. Math. Chem. 60 (2021) 461–473. Crossref, Web of Science, Google Scholar
35. A. Elías-Zúñiga, L. M. Palacias-Pineda, D. Olvera-Trejo and O. Martínez-Romero , Recent strategy to study fractal-order viscoelastic polymer materials using an ancient Chinese algorithm and He’s formulation, J. Low Freq. Noise Vib. Act. Control 41(3) (2022) 842–851. Crossref, Web of Science, Google Scholar
36. K. L. Wang , Novel analytical approach to modified fractal gas dynamics model with the variable coefficients, Z. Angew. Math. Mech. 103(6) (2023) e202100391. Crossref, Web of Science, Google Scholar
37. B. Xiao, W. Wang, X. Zhang, G. Long, J. Fan, H. Chen and L. Deng , A novel fractal solution for permeability and Kozeny–Carman constant of fibrous porous media made up of solid particles and porous fibers, Powder Technol. 349 (2019) 92–98. Crossref, Web of Science, Google Scholar
38. K. Wang and C. Wei , Fractal soliton solutions for the fractal-fractional shallow water wave equation arising in ocean engineering, Alex. Eng. J. 65 (2023) 859–865. Crossref, Web of Science, Google Scholar
39. C. F. Wei , New solitary wave solutions for the fractional Jaulent–Miodek hierarchy model, Fractals 36(7) (2022) 2150612. Google Scholar
40. K. Wang , Solitary wave dynamics of the local fractional Bogoyavlensky–Konopelchenko model, Fractals 31(5) (2023) 2350054. Link, Web of Science, Google Scholar
41. V. E. Tarasov , Continuous medium model for fractal media, Phys. Lett. A 336 (2005) 167–174. Crossref, Web of Science, Google Scholar
42. V. E. Tarasov , Fractional hydrodynamic equations for fractal media, Ann. Phys. 318 (2005) 286–307. Crossref, Web of Science, Google Scholar
43. P. N. Demmie and M. Ostoja-Starzewski , Waves in fractal media, J. Elast. 104 (2011) 187–204. Crossref, Web of Science, Google Scholar
44. C.-H. He and C. Liu , Fractal dimensions of a porous concrete and its effect on the concrete strength, Facta Univ. Ser. Mech. Eng. 21(1) (2023) 137–150. Crossref, Web of Science, Google Scholar
45. M. Liang, C. Fu, B. Xiao, L. Luo and Z. Wang , A fractal study for the effective electrolyte diffusion through charged porous media, Int. J. Heat Mass Transf. 137 (2019) 365–371. Crossref, Web of Science, Google Scholar
46. A. Elías-Zúñiga, L. M. Palacios-Pineda, I. H. Jiménez-Cedeño, O. Martínez-Romero and D. Olvera-Trejo , He’s frequency–amplitude formulation for nonlinear oscillators using Jacobi elliptic functions, J. Low Freq. Noise Vib. Act. Control 39(4) (2020) 1216–1223. Crossref, Web of Science, Google Scholar
47. J.-H. He , Seeing with a single scale is always unbelieving: From magic to two-scale fractal, Therm. Sci. 25(2) (2021) 1217–1219. Crossref, Web of Science, Google Scholar
48. M. Nadeem and J.-H. He , The homotopy perturbation method for fractional differential equations: Part 2, two-scale transform, Int. J. Numer. Methods Heat Fluid Flow 32(2) (2022) 559–567. Crossref, Web of Science, Google Scholar
49. Q. T. Ain, T. Sathiyaraj, S. Karim, M. Nadeem and P. Kandege , ABC fractional derivative for the alcohol drinking model using two-scale fractal dimension, Complexity 2022 (2022) 8531858. Crossref, Web of Science, Google Scholar
50. B. Yu , Fractal dimensions for multiphase fractal media, Fractals 14(2) (2006) 111–118. Link, Web of Science, Google Scholar
51. J. H. He , A tutorial review on fractal spacetime and fractional calculus, Int. J. Theor. Phys. 53 (2014) 3698–3718. Crossref, Web of Science, Google Scholar
52. J. H. He and Q. T. Ain , New promises and future challenges of fractal calculus: From two-scale thermodynamics to fractal variational principle, Therm. Sci. 24(2A) (2020) 659–681. Crossref, Web of Science, Google Scholar
53. A. Elías-Zúñiga, O. Martínez-Romero, L. M. Palacios-Pineda and D. Olvera-Trejo , New analytical solution of the fractal anharmonic oscillator using an ancient Chinese algorithm: Investigating how plasma frequency changes with fractal parameter values, J. Low Freq. Noise Vib. Act. Control 41(3) (2022) 833–841. Crossref, Web of Science, Google Scholar
54. H. Yépez-Martínez and J. F. Gómez-Aguilar , A new modified definition of Caputo–Fabrizio fractional-order derivative and their applications to the Multi Step Homotopy Analysis Method (MHAM), J. Comput. Appl. Math. 346 (2019) 247–260. Crossref, Web of Science, Google Scholar
55. U. von Wagner and L. Lents , On the detection of artifacts in harmonic balance solutions of nonlinear oscillators, Appl. Math. Model. 65 (2019) 408–414. Crossref, Web of Science, Google Scholar
56. J.-H. He, M.-L. Jiao and C.-H. He , Homotopy perturbation method for fractal Duffing oscillator with arbitrary conditions, Fractals 30(9) (2022) 2250165. Link, Web of Science, Google Scholar
57. J.-H. He, M.-L. Jiao, K. A. Gepreel and Y. Khan , Homotopy perturbation method for strongly nonlinear oscillators, Math. Comput. Simul. 204 (2023) 243–258. Crossref, Web of Science, Google Scholar
58. C.-H. He and Y.-O. El-Dib , A heuristic review on the homotopy perturbation method for non-conservative oscillators, J. Low Freq. Noise Vib. Act. Control 41(2) (2022) 572–603. Crossref, Web of Science, Google Scholar