Hybrid solitary wave solutions of the Camassa–Holm equation

Hugues M. Omanda; Clovis T. Djeumen Tchaho; Didier Belobo Belobo

doi:10.1515/ijnsns-2021-0340

Artikel

Hybrid solitary wave solutions of the Camassa–Holm equation

Hugues M. Omanda , Clovis T. Djeumen Tchaho und Didier Belobo Belobo

Veröffentlicht/Copyright: 10. Oktober 2022

Veröffentlicht von

Veröffentlichen auch Sie bei De Gruyter Brill

Informationen für Autor*innen

Aus der Zeitschrift International Journal of Nonlinear Sciences and Numerical Simulation Band 24 Heft 5

Abstract

The Camassa–Holm equation governs the dynamics of shallow water waves or in its reduced form models nonlinear dispersive waves in hyperelastic rods. By using the straightforward Bogning-Djeumen Tchaho-Kofané method, explicit expressions of many solitary wave solutions with different profiles not previously derived in the literature are constructed and classified. Geometric characterizations of the solutions in terms of three new mappings are presented. Intensive numerical simulations carried confirm the stability of the solutions even with relatively high critical velocities and reveal that solitary waves with large widths are more stable than the ones with small widths.

Keywords: Camassa–Holm equation; hybrid solitary waves solutions; numerical simulations; traveling waves

Corresponding author: Didier Belobo Belobo, African Centre for Advanced Studies, P.O. Box 4477, Yaounde, Cameroon; Department of Mathematics and Physical Sciences, National Advanced School of Engineering, University of Yaounde I, P.O. Box 8390, Yaounde, Cameroon; and Laboratory of Biophysics, Department of Physics, Faculty of Science, University of Yaounde I, P.O. Box 812, Yaounde, Cameroon, E-mail: belobodidier@acas-yde.org

Author contribution: All the authors have accepted responsibility for the entire content of this submitted manuscript and approved submission.
Research funding: D. B. B. gratefully acknowledges support via a research fellowship from The World Academy of Sciences (TWAS) and the German Research Foundation (DFG) through the TWAS-DFG Cooperation Visits Programme.
Conflict of interest statement: The authors declare no conflicts of interest regarding this article.

Appendix

The following equations stemming from Eq. (7) were used to derive the families of solutions presented above.

Term in sech¹¹(αξ): (A.1) 510α ³ a ₁ b ₁ = 0

the term in sech¹⁰(αξ): (A.2) 336α ³ c ₁ b ₁ = 0

Term in sech⁹(αξ): (A.3) 204 α 3 ⁡ a + ( 24 α − 1037 α 3 ) a 1 b 1 − 296 α 3 a 1 b = 0

Term in sech⁸(αξ): (A4) − 108 α 3 c + ( 21 α − 862 α 3 ) c 1 b 1 − 182 α 3 c 1 b = 0

Term in sech⁷(αξ): (A5) ( 18 α − 363 α 3 ) a + ( 634 α 3 − 39 α ) a 1 b 1 + − 102 α 3 a + ( 409 α 3 − 18 α ) a 1 b = 0

Term in sech⁶(αξ): (A6) ( 170 α 3 − 15 α ) c + ( 696 α 3 − 63 α ) c 1 b 1 + 38 α 3 c + ( 336 α 3 − 15 α ) c 1 b = 0

Term in sech⁵(αξ): (A7) ( 198 α 3 − 27 α ) a + ( 15 α − 125 α 3 ) a 1 b 1 + ( 121 α 3 − 12 α ) a + ( 15 α − 125 α 3 ) a 1 b = 0

Term in sech⁴(αξ): (A8) 6 α k − ( 18 α 3 + 3 α ) ν + ( 30 α − 34 α 3 ) c + ( 63 α − 150 α 3 ) c 1 b 1 + 6 α 3 ν + ( 9 α − 46 α 3 ) c + ( 30 α − 174 α 3 ) c 1 b = 0

Term in sech³(αξ): (A9) (9α − 27α ³)(b ₁ + b)a = 0

Term in sech²(αξ): (A10) ( 3 α + 36 α 3 ) ν − 6 α k − ( 28 α 3 + 15 α ) c − ( 20 α 3 + 21 α ) c 1 b 1 + ( α − 4 α 3 ) ν − 2 α k + ( 12 α 3 − 9 α ) c + ( 20 α 3 − 15 α ) c 1 b = 0 .

References

[1] R. Camassa and D. D. Holm, “An integrable shallow water equation with peaked solitons,” Phys. Rev. Lett., vol. 71, pp. 1661–1664, 1993. https://doi.org/10.1103/physrevlett.71.1661.Suche in Google Scholar

[2] A. Fokas and B. Fuchssteiner, “Symplectic structures, their Bäcklund transformations and hereditary symmetries,” Physica D, vol. 4, pp. 47–66, 1981. https://doi.org/10.1016/0167-2789(81)90004-x.Suche in Google Scholar

[3] R. S. Johnson, “Camassa-Holm, Korteweg-de Vries and related models for water waves,” J. Fluid Mech., vol. 455, pp. 63–82, 2002. https://doi.org/10.1017/s0022112001007224.Suche in Google Scholar

[4] A. Constantin and J. Escher, “Global existence and blow-up for a shallow water equation,” Ann. Sc. Norm. Super. Pisa - Cl. Sci., vol. 26, pp. 303–328, 1998.Suche in Google Scholar

[5] A. Constantin, “Existence of permanent and breaking waves for a shallow water equation: a geometric approach,” Ann. Inst. Fourier, vol. 50, pp. 321–362, 2000. https://doi.org/10.5802/aif.1757.Suche in Google Scholar

[6] A. Constantin and W. Strauss, “Stability of peakons,” Commun. Pure Appl. Math., vol. 53, pp. 603–610, 2000. https://doi.org/10.1002/(sici)1097-0312(200005)53:5<603::aid-cpa3>3.0.co;2-l.10.1002/(SICI)1097-0312(200005)53:5<603::AID-CPA3>3.0.CO;2-LSuche in Google Scholar

[7] H. H. Dai, “Exact travelling-wave solutions of an integrable equation arising in hyperelastic rods,” Wave Motion, vol. 28, pp. 367–381, 1998. https://doi.org/10.1016/s0165-2125(98)00014-6.Suche in Google Scholar

[8] A. Parker, “On the Camassa-Holm equation and a direct method of solution I. Bilinear form and solitary waves,” Proc. R. Soc. A, vol. 460, pp. 2929–2957, 2004. https://doi.org/10.1098/rspa.2004.1301.Suche in Google Scholar

[9] H. H. Dai, “Model equations for nonlinear dispersive waves in a compressible Mooney-Rivlin rod,” Acta Mech., vol. 127, pp. 193–207, 1998. https://doi.org/10.1007/bf01170373.Suche in Google Scholar

[10] S. Kouranbaeva, “The Camassa-Holm equation as a geodesic flow on the diffeomorphism group,” J. Math. Phys., vol. 40, pp. 857–868, 1998. https://doi.org/10.1063/1.532690.Suche in Google Scholar

[11] A. Bressan and A. Constantin, “Global conservative solutions of the camassa-holm equation,” Arch. Ration. Mech. Anal., vol. 183, pp. 215–239, 2007. https://doi.org/10.1007/s00205-006-0010-z.Suche in Google Scholar

[12] A. I. Zenchuk, “∂̄$\bar{\partial }$-problem for the generalized Korteweg-de Vries equation -dressing,” JETP Lett., vol. 68, pp. 715–755, 1998. https://doi.org/10.1134/1.567940.Suche in Google Scholar

[13] R. A. Kraenkel and A. I. Zenchuk, “Camassa-Holm equation: transformation to deformed sinh-Gordon equations, cuspon and soliton solutions,” J. Phys. Math. Gen., vol. 32, pp. 4733–4747, 1999. https://doi.org/10.1088/0305-4470/32/25/313.Suche in Google Scholar

[14] G. Misiolek, “A shallow water equation as a geodesic flow on the Bott-Virasoro group,” J. Geom. Phys., vol. 24, pp. 203–208, 1998. https://doi.org/10.1016/s0393-0440(97)00010-7.Suche in Google Scholar

[15] A. S. Fokas, “On a class of physically important integrable equations,” Physica D, vol. 87, pp. 145–150, 1995. https://doi.org/10.1016/0167-2789(95)00133-o.Suche in Google Scholar

[16] A. S. Fokas, P. Olver, and P. Rosenau, “A plethora of integrable Bi-Hamiltonian equations,” Prog. Nonlinear Differ. Equ. Appl., vol. 26, pp. 93–101, 1997.10.1007/978-1-4612-2434-1_5Suche in Google Scholar

[17] B. Fuchssteiner, “Some tricks from the symmetry-toolbox for nonlinear equations: generalizations of the camassa-holm equation,” Physica D, vol. 95, pp. 229–243, 1996. https://doi.org/10.1016/0167-2789(96)00048-6.Suche in Google Scholar

[18] F. Gesztesy and H. Holden, “Algebra-Geometric solutions of the camassa-holm hierarchy,” Rev. Matemática Iberoam., vol. 19, pp. 73–142, 2003. https://doi.org/10.4171/rmi/339.Suche in Google Scholar

[19] H. P. McKean, “Integrable systems and algebraic curves,” in Lecture Notes in Mathematics, M. Grmela and J. E. Marsden, Eds., Berlin, Heidelberg, Springer, 2006, pp. 83–2000.10.1007/BFb0069806Suche in Google Scholar

[20] A. Constantin, “On the scattering problem for the Camassa-Holm equation,” Proc. R. Soc. London, A, vol. 457, pp. 953–970, 2001. https://doi.org/10.1098/rspa.2000.0701.Suche in Google Scholar

[21] R. S. Jonhson, “On solutions of the Camassa-Holm equation,” Proc. R. Soc. London, A, vol. 459, pp. 1687–1708, 2003. https://doi.org/10.1098/rspa.2002.1078.Suche in Google Scholar

[22] J. P. Boyd, “Peakons and coshoidal waves: traveling wave solutions of the Camassa-Holm equation,” Appl. Math. Comput., vol. 81, pp. 173–187, 1997. https://doi.org/10.1016/0096-3003(95)00326-6.Suche in Google Scholar

[23] S. Abbasbandy and J. E. Parkes, “Solitary smooth hump solutions of the Camassa-Holm equation by means of the homotopy analysis method,” Chaos, Solit. Fractals, vol. 36, pp. 581–591, 2008. https://doi.org/10.1016/j.chaos.2007.10.034.Suche in Google Scholar

[24] H. H. Dai, Y. Li, and T. Su, “Multi-soliton and multi-cuspon solutions of a Camassa-Holm hierarchy and their interactions,” J. Phys. Math. Theor., vol. 42, pp. 055203–055215, 2009. https://doi.org/10.1088/1751-8113/42/5/055203.Suche in Google Scholar

[25] A. Parker, “On the Camassa-Holm equation and a direct method of solution III. N-soliton solutions,” Proc. R. Soc. A., vol. 461, pp. 3893–3911, 2005. https://doi.org/10.1098/rspa.2005.1537.Suche in Google Scholar

[26] A. Parker, “On the Camassa-Holm equation and a direct method of solution II. Soliton solutions,” Proc. R. Soc. A, vol. 461, pp. 3611–3632, 2005. https://doi.org/10.1098/rspa.2005.1536.Suche in Google Scholar

[27] H. H. Dai and Y. Li, “The interaction of the ω-soliton and ω-cuspon of the Camassa-Holm equation,” J. Phys. Math. Gen., vol. 38, pp. L685–L694, 2005. https://doi.org/10.1088/0305-4470/38/42/l04.Suche in Google Scholar

[28] R. Camassa, D. D. Holm, and J. M. Hyman, “A new integrable shallow water equation,” Adv. Appl. Mech., vol. 31, pp. 1–33, 1994.10.1016/S0065-2156(08)70254-0Suche in Google Scholar

[29] S. P. Popov, “Numerical study of peakons and k-solitons of the camassa-holm and holm-hone equations,” Comput. Math. Math. Phys., vol. 51, pp. 1231–1238, 2011. https://doi.org/10.1134/s0965542511070153.Suche in Google Scholar

[30] J. Lenells, “Traveling wave solutions of the Camassa-Holm equation,” J. Differ. Equ., vol. 217, pp. 393–430, 2005. https://doi.org/10.1016/j.jde.2004.09.007.Suche in Google Scholar

[31] J. R. Bogning, C. T. Djeumen Tchaho, and T. C. Kofané, “Construction of the soliton solutions of the Ginzburg-Landau equations by the new Bogning-Djeumen Tchaho-Kofané method,” Phys. Scripta, vol. 85, pp. 025013–025017, 2012. https://doi.org/10.1088/0031-8949/85/02/025013.Suche in Google Scholar

[32] J. R. Bogning, C. T. Djeumen Tchaho, and T. C. Kofané, “Solitary wave solutions of the modified Sasa-Satsuma nonlinear partial differential equation,” Am. J. Comput. Appl. Math., vol. 3, pp. 131–137, 2013.Suche in Google Scholar

[33] J. R. Bogning, C. T. Djeumen Tchaho, and T. C. Kofané, “Generalization of the Bogning-Djeumen Tchaho- Kofané method for the construction of solitary waves and the survey of the instabilities,” Far. East J. Dynam. Syst., vol. 20, pp. 101–119, 2012.Suche in Google Scholar

[34] C. T. Djeumen Tchaho, H. M. Omanda, and D. Belobo Belobo, “Hybrid solitary waves for the generalized Kuramoto-Sivashinsky equation,” Eur. Phys. J. Plus, vol. 133, pp. 387–395, 2018. https://doi.org/10.1140/epjp/i2018-12218-4.Suche in Google Scholar

[35] A. R. Seadawy and S. Z. Alamri, “Mathematical methods via the nonlinear two-dimensional water waves of Olver dynamical equation and its exact solitary wave solutions,” Results Phys., vol. 8, pp. 276–289, 2018. https://doi.org/10.1016/j.rinp.2017.12.008.Suche in Google Scholar

[36] A. R. Seadawy, “Solitary wave solutions of two-dimensional nonlinear Kadomtsev-Petviashvili dynamic equation in dust-acoustic plasmas,” Pramana - J. Phys., vol. 89, pp. 49–59, 2017. https://doi.org/10.1007/s12043-017-1446-4.Suche in Google Scholar

[37] A. R. Seadawy, “Ion acoustic solitary wave solutions of two-dimensional nonlinear Kadomtsev-Petviashvili-Burgers equation in quantum plasma,” Math. Methods Appl. Sci., vol. 40, pp. 1598–1607, 2017. https://doi.org/10.1002/mma.4081.Suche in Google Scholar

[38] I. A. Aliyu, M. Inc, A. Yusuf, and D. Baleanu, “A fractional model of vertical transmission and cure of vector-borne diseases pertaining to the Atangana-Baleanu fractional derivatives,” Chaos, Solit. Fractals, vol. 116, pp. 268–277, 2018. https://doi.org/10.1016/j.chaos.2018.09.043.Suche in Google Scholar

[39] X. F. Yang, Z. C. Deng, and Y. Wei, “A Riccati-Bernoulli sub-ODE method for nonlinear partial differential equations and its application,” Adv. Differ. Equ., vol. 2015, pp. 117–133, 2015. https://doi.org/10.1186/s13662-015-0452-4.Suche in Google Scholar

[40] A. Yusuf, M. Inc, I. A. Aliyu, and D. Baleanu, “Beta derivative applied to dark and singular optical solitons for the resonance perturbed NLSE,” Eur. Phys. J. Plus, vol. 134, pp. 433–440, 2019. https://doi.org/10.1140/epjp/i2019-12810-0.Suche in Google Scholar

[41] M. A. Salam, M. S. Uddin, and P. Dey, “Generalized Bernoulli sub-ODE method and its applications,” Ann. Pure Appl. Math., vol. 10, pp. 1–6, 2015.Suche in Google Scholar

[42] A. Yusuf, M. Inc, and M. Bayram, “Invariant and simulation analysis to the time fractional Abrahams-Tsuneto reaction diffusion system,” Phys. Scr., vol. 94, pp. 125005–125027, 2019. https://doi.org/10.1088/1402-4896/ab373b.Suche in Google Scholar

[43] S. B. G. Karakoc, T. Geyikli, and A. Bashan, “A numerical solution of the Modified Regularized Long Wave MRLW equation using quartic B-splines,” TWMS J. App. Eng. Math., vol. 3, pp. 231–244, 2013.10.1186/1687-2770-2013-27Suche in Google Scholar

[44] S. B. G. Karakoc and T. Geyikli, “Petrov-Galerkin finite element method for solving the MRLW equation,” Math. Sci., vol. 7, pp. 1–10, 2013.10.1186/2251-7456-7-25Suche in Google Scholar

[45] S. K. Bhowmik and S. B. G. Karakoc, “Numerical approximation of the gen- eralized regularized long wave equation using Petrov-Galerkin finite element method,” Numer. Methods Part. Differ. Equ., vol. 35, pp. 2236–2257, 2019. https://doi.org/10.1002/num.22410.Suche in Google Scholar

[46] H. Zeybek and S. B. G. Karakoc, “Application of the collocation method with B-splines to the GEW equation,” Electron. Trans. Numer. Anal., vol. 44, pp. 71–88, 2017.Suche in Google Scholar

[47] M. S. Fabien, “Spectral methods for partial differential equations that model shallow water wave phenomena,” Masters Thesis, University of Washinton, 2019.Suche in Google Scholar

Received: 2021-08-29

Revised: 2022-09-06

Accepted: 2022-09-18

Published Online: 2022-10-10

Sie haben derzeit keinen Zugang zu diesem Inhalt.

Artikel in diesem Heft

https://doi.org/10.1515/ijnsns-2021-0340

Schlagwörter für diesen Artikel

Camassa–Holm equation; hybrid solitary waves solutions; numerical simulations; traveling waves