N-Lump Solutions to a (3+1)-Dimensional Variable-Coefficient Generalized Nonlinear Wave Equation in a Liquid with Gas Bubbles

Yingfang Pan; Jalil Manafian; Subhiya M. Zeynalli; Riyadh Al Obaidi; R. Sivaraman; Ammar Kadi

Ayuda

N-Lump Solutions to a (3+1)-Dimensional Variable-Coefficient Generalized Nonlinear Wave Equation in a Liquid with Gas Bubbles

Autores: Yingfang Pan, Jalil Manafian, Subhiya M. Zeynalli, Riyadh Al Obaidi, R. Sivaraman, Ammar Kadi
Localización: Qualitative theory of dynamical systems, ISSN 1575-5460, Vol. 21, Nº 4, 2022
Idioma: inglés
Enlaces
- Texto completo (pdf)
Resumen
- In this paper, the (3+1)-dimensional variable-coefficient generalized nonlinear wave equation arising in a liquid with gas bubbles is studied. The Hirota bilinear technique and binary bell polynomials are considered. Some new analytic solutions containing one-lump soliton, two-lump soliton, and three-lump soliton, and also 1-breather and 1- lump, the interaction 1-bell-shaped soliton with 1-lump or 1-breather, and other soliton solutions to the mentioned equation are obtained and analyzed. To create the solutions of Maple symbolic package is used. Using suitable mathematical assumptions and Hirota’s bilinear technique, the new types of M-soliton and N-soliton solutions are derived and established in view of the hyperbolic, trigonometric, and rational functions of the governing equation. To achieve this, an illustrative example of the nonlinear wave equation in a liquid with gas bubbles is provided to demonstrate the feasibility and reliability of the procedure used in this study. The trajectory solutions of the Nsoliton are shown explicitly and graphically (2D, density, and 3D graphs). The effect of parameters on the behavior of acquired solutions for N = 3, 4, 5 orders are also discussed. By comparing the proposed method with the other existing methods, the results show that the execution of this method is concise, simple, and straightforward.
  
  The results are useful for obtaining and explaining some new soliton phenomena.
Referencias bibliográficas
- 1. Manafian, J., Lakestani, M.: Abundant soliton solutions for the Kundu-Eckhaus equation via tan(φ/2)- expansion method. Optik 127, 5543–5551...
- 2. Dehghan, M., Manafian, J.: The solution of the variable coefficients fourth-order parabolic partial differential equations by homotopy...
- 3. Alimirzaluo, E., Nadjafikhah, M., Manafian, J.: Some new exact solutions of (3+1)-dimensional Burgers system via Lie symmetry analysis....
- 4. Rao, K.M.K., Aneela, N.J., Sri, K.Y., Prasanna, K.N., Sahithi, N., Likhitha, L.: Design Of clocked Jk flip flop using air hole structured...
- 5. Xu, D., Liu, J., Ma, T., Zhao, X., Ma, H., Li, J.: Coupling of sponge fillers and two-zone clarifiers for granular sludge in an integrated...
- 6. Qin, X., Zhang, L., Yang, L., Cao, S.: Heuristics to sift extraneous factors in Dixon resultants. J. Symb. Comput. 112, 105–121 (2022)
- 7. Srinivasareddy, D.R.S., Narayana, D.R.Y.V., Krishna, D.R.D.: Sector beam synthesis in linear antenna arrays using social group optimization...
- 8. Mohammadzadeh, A., Castillo, O., Band, S.S., Mosavi, A.: A novel fractional-order multiple-model type-3 fuzzy control for nonlinear systems...
- 9. Della, Volpe C., Siboni, S.: From van der Waals equation to acid-base theory of surfaces: a chemicalmathematical journey. Rev. Adhes. Adhes....
- 10. Manafian, J.: Novel solitary wave solutions for the (3+1)-dimensional extended Jimbo-Miwa equations. Comput. Math. Appl. 76(5), 1246–1260...
- 11. Nisar, K.S., Ilhan, O.A., Abdulazeez, S.T., Manafian, J., Mohammed, S.A., Osman, M.S.: Novel multiple soliton solutions for some nonlinear...
- 12. Fayaz, S.A., Zaman, M., Butt, M.A.: Numerical and experimental investigation of meteorological data using adaptive linear M5 model tree...
- 13. Guo, B., Dong, H., Fang, Y.: Lump solutions and interaction solutions for the dimensionally reduced nonlinear evolution equation. Complexity...
- 14. Manakkadu, S., Dutta, S.: On efficient resource allocation in the internet of things environment. In: Proceedings of the 8th international...
- 15. Wickramasinghe, K.: The use of deep data locality towards a hadoop performance analysis framework. Int. J. Commun. Comput. Tech. 8(1),...
- 16. Xiao, Y., Fan, E., Liu, P.: Inverse scattering transform for the coupled modified Korteweg-de Vries equation with nonzero boundary conditions....
- 17. Wen, X.Y., Xu, X.G.: Multiple soliton solutions and fusion interaction phenomena for the (2+1)- dimensional modified dispersive water-wave...
- 18. Ren, B., Ma, W.X., Yu, J.: Rational solutions and their interaction solutions of the (2+1)-dimensional modified dispersive water wave...
- 19. Al-Sanjary, O.I., Ahmed, A.A., Jaharadak, A.A.B., Ali, M.A., Zangana, H.M.: Detection clone an object movement using an optical flow approach....
- 20. Liu, F.Y., Gao, Y.T., Yu, X., Hu, L., Wu, X.H.: Hybrid solutions for the (2+1)-dimensional variablecoefficient Caudrey-Dodd-Gibbon-Kotera-Sawada...
- 21. Ma, K., Li, Z., Liu, P., Yang, J., Geng, Y., Yang, B., Guan, X.: Reliability-constrained throughput optimization of industrial wireless...
- 22. Xu, X., Niu, D., Xiao, B., Guo, X., Zhang, L., Wang, K.: Policy analysis for grid parity of wind power generation in China. Energy Policy...
- 23. Yan, W., Cao, M., Fan, S., Liu, X., Liu, T., Li, H., Su, J.: Multi-yolk ZnSe/2(CoSe2)@NC heterostructures confined in N-doped carbon...
- 24. Nasiboglu, R.: A novel fuzzy inference model with rule-based defuzzification approach. J. Modern Tech. Eng. 7, 124–133 (2022)
- 25. Ma, H., Huang, H., Deng, A.: Soliton molecules, asymmetric solitons and hybrid solutions for KdVCDG equation. Partial Diff. Eq. Appl....
- 26. Zhang, S.S., Xub, T., Li, M., Zhang, X.F.: Higher-order algebraic soliton solutions of the GerdjikovIvanov equation: Asymptotic analysis...
- 27. Wang, S.: Novel multi-soliton solutions in (2+1)-dimensional PT-symmetric couplers with varying coefficients. Optik 252, 168495 (2022)
- 28. Wu, J.: N-soliton, M-breather and hybrid solutions of a time-dependent Kadomtsev-Petviashvili equation. Math. Comput. Simul. 194, 89–96...
- 29. Wang, Y., Chen, Y.: Bell polynomials approach for two higher-order KdV-type equations in fluids. Nonlinear Anal. Real World Appl. 31,...
- 30. Li, Q., Shan, W., Wang, P., Cui, H.: Breather, lump and N-soliton wave solutions of the (2+1)- dimensional coupled nonlinear partial...
- 31. Sadat, R., Kassem, M., Ma, W.X.: Abundant lump-type solutions and interaction solutions for a nonlinear (3+1) dimensional model. Adv....
- 32. Lü, J., Bilige, S., Chaolu, T.: The study of lump solution and interaction phenomenon to (2+1)- dimensional generalized fifth-order...
- 33. Kudryashov, N.A., Sinelshchikov, D.I.: Nonlinear waves in bubbly liquids with consideration for viscosity and heat transfer. Phys. Lett....
- 34. Kudryashov, N.A., Sinelshchikov, D.I.: Nonlinear waves in liquids with gas bubbles with account of viscosity and heat transfer. Fluid...
- 35. Wang, H., Tian, S., Zhang, T., Chen, Y.: Lump wave and hybrid solutions of a generalized (3+1)- dimensional nonlinear wave equation...
- 36. Tu, J.M., Tian, S.F., Xu, M.J., Song, X.Q., Zhang, T.T.: Bäcklund transformation, infinite conservation laws and periodic wave solutions...
- 37. Deng, G.F., Gao, Y.T.: Integrability, solitons, periodic and travelling waves of a generalized (3+1)- dimensional variable-coefficient...
- 38. Liu, J.G., Zhu, W.H., He, Y., Wu, Y.K.: Interaction phenomena between lump and solitary wave of a generalized (3+1)-dimensional variable-coefficient...
- 39. Guo, Y.R., Chen, A.H.: Hybrid exact solutions of the (3+1)-dimensional variable-coefficient nonlinear wave equation in liquid with...
- 40. Zhou, X., Ilhan, O.A., Zhou, F., Sutarto, S., Manafian, J., Abotaleb, M.: Lump and interaction solutions to the (3+1)-dimensional...
- 41. Hirota, R.: Exact solution of the Korteweg-de Vries equation for multiple collisions of solitons. Phys. Rev. Lett. 27, 1192–1194 (1971)
- 42. Satsuma, J., Ablowitz, M.J.: Two-dimensional lumps in nonlinear dispersive systems. J. Math. Phys. 20, 1496–1503 (1979)
- 43. Ohta, Y., Yang, J.K.: Rogue waves in the Davey-Stewartson I equation. Phys. Rev. E 86, 036604 (2012)
- 44. Lou, S.Y.: Prohibitions caused by nonlocality for nonlocal Boussinesq-KdV type systems. Stud. Appl. Math. 143, 123–138 (2019)
- 45. Lou, S.Y.: Soliton molecules and asymmetric solitons in three fifth order systems via velocity resonance. J. Phys. Commun. 4, 041002 (2020)
- 46. Zhang, Z., Qi, Z.Q., Li, B.: Fusion and fission phenomena for (2+1)-dimensional fifth-order KdV system. Appl. Math. Lett. 116, 107004...
- 47. Yin, Y.H., Ma, W.X., Liu, J.G., Lü, X.: Diversity of exact solutions to a (3+1)-dimensional nonlinear evolution equation and its reduction....
- 48. Liu, J.G., Eslami, M., Rezazadeh, H., Mirzazadeh, M.: Rational solutions and lump solutions to a nonisospectral and generalized variable-coefficient...
- 49. Gao, X.Y., Guo, Y.J., Shan, W.R.: Hetero-Bäcklund transformation, bilinear forms and N solitons for a generalized three-coupled Korteweg-de...
- 50. Liu, J.G., Zhu, W.H.: Multiple rogue wave, breather wave and interaction solutions of a generalized (3+1)-dimensional variable-coefficient...
- 51. Yang, S., Tan, J., Chen, B.: Robust spike-based continual meta-learning improved by restricted minimum error entropy criterion. Entropy...
- 52. Meng, F., Wang, D., Yang, P., Xie, G., Cutberto, R., Romero-Meléndez, C.: Application of sum of squares method in nonlinear H8 control...
- 53. Manafian, J., Lakestani, M.: N-lump and interaction solutions of localized waves to the (2+1)- dimensional variable-coefficient Caudrey-Dodd-Gibbon-Kotera-Sawada...
- 54. Ren, J., Ilhan, O.A., Bulut, H., Manafian, J.: Multiple rogue wave, dark, bright, and solitary wave solutions to the KP-BBM equation....
- 55. Zhou, X., Ilhan, O.A., Manafian, J., Singh, G., Tuguz, N.S.: N-lump and interaction solutions of localized waves to the (2+1)-dimensional...
- 56. Manafian, J., Mohammed, S.A., Alizadeh, A., Baskonus, H.M., Gao, W.: Investigating lump and its interaction for the third-order evolution...
- 57. Hong, X., Manafian, J., Ilhan, O.A., Alkireet, A.I.A., Nasution, M.K.M.: Multiple soliton solutions of the generalized Hirota-Satsuma-Ito...
- 58. Gao, X.Y., Guo, Y.J., Shan, W.R.: Optical waves/modes in a multicomponent inhomogeneous optical fiber via a three-coupled variable-coefficient...
- 59. Gao, X.Y., Guo, Y.J., Shan, W.R.: Bilinear forms through the binary Bell polynomials, N solitons and Backlund transformations of the Boussinesq-Burgers...
- 60. Gao, X.Y., Guo, Y.J., Shan, W.R.: Symbolic computation on a (2+1)-dimensional generalized variablecoefficient Boiti-Leon-Pempinelli...
- 61. Gao, X.Y., Guo, Y.J., Shan,W.R.: Looking at an open sea via a generalized (2+1)-dimensional dispersive long-wave system for the shallow...
- 62. Wang, M., Tian, B., Hu, C.C., Liu, S.H.: Generalized Darboux transformation, solitonic interactions and bound states for a coupled fourth-order...
- 63. Yang, D.Y., Tian, B., Qu, Q.X., Zhang, C.R., Chen, S.S., Wei, C.C.: Lax pair, conservation laws, Darboux transformation and localized...
- 64. Ma, W.X.: Riemann-Hilbert problems and soliton solutions of nonlocal reverse-time NLS hierarchies. Acta Math. Sci. 42, 127–140 (2022)
- 65. Ma, W.X.: Riemann-Hilbert problems and inverse scattering of nonlocal real reverse-spacetime matrix AKNS hierarchies. Phys. D 430, 133078...
- 66. Ma, W.X.: Nonlocal PT-symmetric integrable equations and related Riemann-Hilbert problems. Partial Diff. Eq. Appl. Math. 4, 100190 (2021)
- 67. Ma, W.X.: Riemann-Hilbert problems and soliton solutions of type (λ∗, −λ∗) reduced nonlocal integrable mKdV hierarchies. Math. 10, 870...
- 68. Ma, W.X.: Type (−λ∗, −λ∗) reduced nonlocal integrable mKdV equations and their soliton solutions. Appl. Math. Lett. 131, 108074 (2022)
- 69. Ma, W.X.: Nonlocal integrable mKdV equations by two nonlocal reductions and their soliton solutions. J. Geom. Phys. 177, 104522 (2022)
- 70. Benjamin, T.B.: Internal waves of permanent form in fluids of great depth. J. Fluid Mech. 29, 559–592 (1967)
- 71. Dong, H., Gao, Y.: Existence and uniqueness of bounded stable solutions to the Peierls-Nabarro model for curved dislocations. Calc. Var....
- 72. Gao, Y., Liu, J.G., Liu, Z.: Existence and rigidity of the vectorial Peierls-Nabarro model for dislocations in high dimensions. Nonlinearity...
- 73. Gai, L.T., Ma, W.X., Li, M.C.: Lump-type solution and breather lump-kink interaction phenomena to a (3+1)-dimensional GBK equation...
- 74. Ma, W.X.: Bilinear equations, bell polynomials and linear superposition principle. J. Phys. Conf. Ser. 411, 012021 (2013)
- 75. Wang, C.J.: Spatiotemporal deformation of lump solution to (2+1)-dimensional KdV equation. Nonlinear Dyn. 84, 697–702 (2016)