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Novel Traveling Wave Solutions of Jaulent-Miodek Equations and Coupled Konno-Oono Systems and Their Dynamics

Year 2023, Volume: 5 Issue: 4, 281 - 285, 31.12.2023
https://doi.org/10.51537/chaos.1322939

Abstract

This research article deals with analytical solutions to two problems. The first is the (1+1)-coupled Jaulent-Miodek system of equations, which is associated with the energy-dependent Schrödinger potential, whereas the second problem, the system of coupled Konno-Oono equations relates to complexity and chaos in electromagnetic fields. Similarity reductions via Lie-symmetry analysis is performed for the systems to derive their analytical solutions. Since Lie symmetry involves arbitrary constants in the infinitesimals, this opens up more possibilities for getting a rich variety of analytical solutions for both real-life problems. The analytical solutions are supplemented graphically to understand them in a better way. Traveling wave profiles are obtained eventually. Solution for CKOEs are different from the earlier research (Kumar and Kumar 2022a; Kumar et al. 2022) as far as the authors are aware.

References

  • Abdelrahman, M. and H. Alkhidhr, 2020 Fundamental solutions for the new coupled Konno-Oono equation in magnetic field. Results Phys. 19: 103445.
  • Abdullah, F. A., M. T. Islam, J. F. Gómez-Aguilar, and M. A. Akbar, 2023 Impressive and innovative soliton shapes for nonlinear Konno–Oono system relating to electromagnetic field. Opt. Quantum Electron. 55: 69.
  • Alam, M. N. and F. B. M. Belgacem, 2016 New generalized (G’/G)- expansion method applications to coupled Konno-Oono equation. Adv. Pure Math. 06: 168–179.
  • Bashar, M. A., G. Mondal, K. Khan, and A. Bekir, 2016 Traveling wave solutions of new coupled konno-oono equation. New Trends in Mathematical Sciences 4: 296–303.
  • Bluman, G. and J. Cole, 1974 Similarity Methods for Differential Equations. Springer New York.
  • Hirota, R. and S. Tsujimoto, 1994 Note on “new coupled integrable dispersionless equations”. J. Phys. Soc. Japan 63: 3533–3533.
  • Jaulent, M. and I. Miodek, 1976 Nonlinear evolution equations associated with energy dependent schrödinger potentials. Lett. Math. Phys. 1: 243–250.
  • Kakuhata, H. and K. Konno, 1996 A Generalization of Coupled Integrable, Dispersionless System. J. Phys. Soc. Japan 65: 340– 341.
  • Karaca, Y., 2023 Computational complexity-based fractional-order neural network models for the diagnostic treatments and predictive transdifferentiability of heterogeneous cancer cell propensity. Chaos Theory and Applications 5: 34–51.
  • Karaca, Y. and D. Baleanu, 2022 Evolutionary mathematical science, fractional modeling and artificial intelligence of nonlinear dynamics in complex systems. Chaos Theory and Applications 4: 111–118.
  • Khalique, M., 2012 Exact solutions and conservation laws of a coupled integrable dispersionless system. Filomat 26: 957–964.
  • Khan, K. and M. A. Akbar, 2013 TravelingWave Solutions of Some Coupled Nonlinear Evolution Equations. ISRN Math. Phys. 2013: 1–8.
  • Khater, M. M., A. R. Seadawy, and D. Lu, 2018 Dispersive solitary wave solutions of new coupled Konno-Oono, Higgs field and Maccari equations and their applications. J. King Saud Univ. - Sci. 30: 417–423.
  • Koçak, Z. F., H. Bulut, D. A. Koc, and H. M. Baskonus, 2016 Prototype traveling wave solutions of new coupled Konno-Oono equation. Optik (Stuttg). 127: 10786–10794.
  • Konno, K. and H. Kakuhata, 1995 Interaction Among Growing, Decaying and Stationary Solitons for Coupled Integrable Dispersionless Equations. J. Phys. Soc. Japan 64: 2707–2709.
  • Konno, K. and H. Kakuhata, 1996 Novel solitonic evolutions in a coupled integrable, dispersionless system. J. Phys. Soc. Japan 65: 713–721.
  • Konno, K. and H. Oono, 1994 New Coupled Integrable Dispersionless Equations. J. Phys. Soc. Japan 63: 377–378.
  • Kumar, R. and A. Kumar, 2022a Dynamical behavior of similarity solutions of CKOEs with conservation law. Appl. Math. Comput. 422: 126976.
  • Kumar, R. and A. Kumar, 2022b Some invariant solutions of coupled Konno-Oono equations arising in electromagnetic and quantum fields. Phys. Scr. 97: 075501.
  • Kumar, R., K. Pandey, and A. Kumar, 2022 Dynamical Behavior of the Solutions of Coupled Boussinesq–Burgers Equations Occurring at the Seaside Beaches. Brazilian J. Phys. 52: 201.
  • Kumar, R., R. Verma, and A. Tiwari, 2023 On similarity solutions to (2+1)-dispersive long-wave equations. J. Ocean Eng. Sci. 8: 111–123.
  • Manafian, J., I. Zamanpour, and A. Ranjbaran, 2018 On some new analytical solutions for new coupled Konno–Oono equation by the external trial equation method. J. Phys. Commun. 2: 015023.
  • Mirhosseini-Alizamini, S. M., H. Rezazadeh, K. Srinivasa, and A. Bekir, 2020 New closed form solutions of the new coupled Konno–Oono equation using the new extended direct algebraic method. Pramana 94: 52.
  • Mohammed, W. W., N. Iqbal, A. Ali, and M. El-Morshedy, 2021 Exact solutions of the stochastic new coupled Konno-Oono equation. Results Phys. 21: 103830.
  • Olver, P., 1993 Applications of Lie groups to differential equations, volume 107. Springer Science & Business Media.
  • Özer, H. and S. Saliho˘ glu, 2007 Nonlinear Schrödinger equations and N=1 superconformal algebra. Chaos, Solitons & Fractals 33: 1417–1423.
  • Pan, B. T. L.W. Q. Q.-X.,W. and J. Yan, 2010 Conservation laws and analytic soliton solutions for coupled integrable dispersionless equations with symbolic computation. Commun. Theor. Phys. 54: 687–696.
  • Souleymanou, A., V. K. Kuetche, T. B. Bouetou, and T. C. Kofane, 2012 Traveling Wave-Guide Channels of a New Coupled Integrable Dispersionless System. Commun. Theor. Phys. 57: 10–14.
  • Torvattanabun, M., P. Juntakud, A. Saiyun, and N. Khansai, 2018 The new exact solutions of the new coupled Konno-Oono equation by using extended simplest equation method. Appl. Math. Sci. 12: 293–301.
  • Wang, K.-J. and J.-H. Liu, 2022 Study on abundant analytical solutions of the new coupled Konno–Oono equation in the magnetic field. Open Phys. 20: 390–401.
  • Xu, G. et al., 2014 N-fold darboux transformation of the jaulentmiodek equation. Applied Mathematics 5: 2657.
  • Yel, G., H. M. Baskonus, and H. Bulut, 2017 Novel archetypes of new coupled Konno–Oono equation by using sine–Gordon expansion method. Opt. Quantum Electron. 49: 285.
  • Zahran, E. and A. Bekir, 2023 New diverse soliton solutions for the coupled konno-oono equations. Optical and Quantum Electronics 55: 1–12.
  • Zhou, R., 1997 The finite-band solution of the Jaulent–Miodek equation. J. Math. Phys. 38: 2535–2546.
Year 2023, Volume: 5 Issue: 4, 281 - 285, 31.12.2023
https://doi.org/10.51537/chaos.1322939

Abstract

References

  • Abdelrahman, M. and H. Alkhidhr, 2020 Fundamental solutions for the new coupled Konno-Oono equation in magnetic field. Results Phys. 19: 103445.
  • Abdullah, F. A., M. T. Islam, J. F. Gómez-Aguilar, and M. A. Akbar, 2023 Impressive and innovative soliton shapes for nonlinear Konno–Oono system relating to electromagnetic field. Opt. Quantum Electron. 55: 69.
  • Alam, M. N. and F. B. M. Belgacem, 2016 New generalized (G’/G)- expansion method applications to coupled Konno-Oono equation. Adv. Pure Math. 06: 168–179.
  • Bashar, M. A., G. Mondal, K. Khan, and A. Bekir, 2016 Traveling wave solutions of new coupled konno-oono equation. New Trends in Mathematical Sciences 4: 296–303.
  • Bluman, G. and J. Cole, 1974 Similarity Methods for Differential Equations. Springer New York.
  • Hirota, R. and S. Tsujimoto, 1994 Note on “new coupled integrable dispersionless equations”. J. Phys. Soc. Japan 63: 3533–3533.
  • Jaulent, M. and I. Miodek, 1976 Nonlinear evolution equations associated with energy dependent schrödinger potentials. Lett. Math. Phys. 1: 243–250.
  • Kakuhata, H. and K. Konno, 1996 A Generalization of Coupled Integrable, Dispersionless System. J. Phys. Soc. Japan 65: 340– 341.
  • Karaca, Y., 2023 Computational complexity-based fractional-order neural network models for the diagnostic treatments and predictive transdifferentiability of heterogeneous cancer cell propensity. Chaos Theory and Applications 5: 34–51.
  • Karaca, Y. and D. Baleanu, 2022 Evolutionary mathematical science, fractional modeling and artificial intelligence of nonlinear dynamics in complex systems. Chaos Theory and Applications 4: 111–118.
  • Khalique, M., 2012 Exact solutions and conservation laws of a coupled integrable dispersionless system. Filomat 26: 957–964.
  • Khan, K. and M. A. Akbar, 2013 TravelingWave Solutions of Some Coupled Nonlinear Evolution Equations. ISRN Math. Phys. 2013: 1–8.
  • Khater, M. M., A. R. Seadawy, and D. Lu, 2018 Dispersive solitary wave solutions of new coupled Konno-Oono, Higgs field and Maccari equations and their applications. J. King Saud Univ. - Sci. 30: 417–423.
  • Koçak, Z. F., H. Bulut, D. A. Koc, and H. M. Baskonus, 2016 Prototype traveling wave solutions of new coupled Konno-Oono equation. Optik (Stuttg). 127: 10786–10794.
  • Konno, K. and H. Kakuhata, 1995 Interaction Among Growing, Decaying and Stationary Solitons for Coupled Integrable Dispersionless Equations. J. Phys. Soc. Japan 64: 2707–2709.
  • Konno, K. and H. Kakuhata, 1996 Novel solitonic evolutions in a coupled integrable, dispersionless system. J. Phys. Soc. Japan 65: 713–721.
  • Konno, K. and H. Oono, 1994 New Coupled Integrable Dispersionless Equations. J. Phys. Soc. Japan 63: 377–378.
  • Kumar, R. and A. Kumar, 2022a Dynamical behavior of similarity solutions of CKOEs with conservation law. Appl. Math. Comput. 422: 126976.
  • Kumar, R. and A. Kumar, 2022b Some invariant solutions of coupled Konno-Oono equations arising in electromagnetic and quantum fields. Phys. Scr. 97: 075501.
  • Kumar, R., K. Pandey, and A. Kumar, 2022 Dynamical Behavior of the Solutions of Coupled Boussinesq–Burgers Equations Occurring at the Seaside Beaches. Brazilian J. Phys. 52: 201.
  • Kumar, R., R. Verma, and A. Tiwari, 2023 On similarity solutions to (2+1)-dispersive long-wave equations. J. Ocean Eng. Sci. 8: 111–123.
  • Manafian, J., I. Zamanpour, and A. Ranjbaran, 2018 On some new analytical solutions for new coupled Konno–Oono equation by the external trial equation method. J. Phys. Commun. 2: 015023.
  • Mirhosseini-Alizamini, S. M., H. Rezazadeh, K. Srinivasa, and A. Bekir, 2020 New closed form solutions of the new coupled Konno–Oono equation using the new extended direct algebraic method. Pramana 94: 52.
  • Mohammed, W. W., N. Iqbal, A. Ali, and M. El-Morshedy, 2021 Exact solutions of the stochastic new coupled Konno-Oono equation. Results Phys. 21: 103830.
  • Olver, P., 1993 Applications of Lie groups to differential equations, volume 107. Springer Science & Business Media.
  • Özer, H. and S. Saliho˘ glu, 2007 Nonlinear Schrödinger equations and N=1 superconformal algebra. Chaos, Solitons & Fractals 33: 1417–1423.
  • Pan, B. T. L.W. Q. Q.-X.,W. and J. Yan, 2010 Conservation laws and analytic soliton solutions for coupled integrable dispersionless equations with symbolic computation. Commun. Theor. Phys. 54: 687–696.
  • Souleymanou, A., V. K. Kuetche, T. B. Bouetou, and T. C. Kofane, 2012 Traveling Wave-Guide Channels of a New Coupled Integrable Dispersionless System. Commun. Theor. Phys. 57: 10–14.
  • Torvattanabun, M., P. Juntakud, A. Saiyun, and N. Khansai, 2018 The new exact solutions of the new coupled Konno-Oono equation by using extended simplest equation method. Appl. Math. Sci. 12: 293–301.
  • Wang, K.-J. and J.-H. Liu, 2022 Study on abundant analytical solutions of the new coupled Konno–Oono equation in the magnetic field. Open Phys. 20: 390–401.
  • Xu, G. et al., 2014 N-fold darboux transformation of the jaulentmiodek equation. Applied Mathematics 5: 2657.
  • Yel, G., H. M. Baskonus, and H. Bulut, 2017 Novel archetypes of new coupled Konno–Oono equation by using sine–Gordon expansion method. Opt. Quantum Electron. 49: 285.
  • Zahran, E. and A. Bekir, 2023 New diverse soliton solutions for the coupled konno-oono equations. Optical and Quantum Electronics 55: 1–12.
  • Zhou, R., 1997 The finite-band solution of the Jaulent–Miodek equation. J. Math. Phys. 38: 2535–2546.
There are 34 citations in total.

Details

Primary Language English
Subjects Metrology, Applied and Industrial Physics
Journal Section Research Articles
Authors

Raj Kumar This is me 0000-0002-9650-5606

Krıpa Shankar Pandey This is me 0000-0002-4878-7872

Avneesh Kumar This is me 0000-0002-4385-727X

Anshu Kumar 0009-0003-2130-592X

Publication Date December 31, 2023
Published in Issue Year 2023 Volume: 5 Issue: 4

Cite

APA Kumar, R., Pandey, K. S., Kumar, A., Kumar, A. (2023). Novel Traveling Wave Solutions of Jaulent-Miodek Equations and Coupled Konno-Oono Systems and Their Dynamics. Chaos Theory and Applications, 5(4), 281-285. https://doi.org/10.51537/chaos.1322939

Chaos Theory and Applications in Applied Sciences and Engineering: An interdisciplinary journal of nonlinear science 23830 28903   

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