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Theoretical examination and simulations of two nonlinear evolution equations along with stability analysis

Muhammad Abdaal Bin Iqbal, Ejaz Hussain, Syed Asif Ali Shah, Zhao Li, Muhammd Zubair Raza, Adham E. Ragab, Emad A. Az-Zo’bi, Mohamed R. Ali

2024Results in Physics10 citationsDOIOpen Access PDF

Abstract

Nonlinear evolution equations are employed in the representation of diverse intricate physical events, and the identification of precise solutions for these equations holds significance about their practical implementations. One of the significant challenges is the identification of traveling wave solutions inside established nonlinear evolution systems in the field of mathematical physics. In the present research, we employ the modified sub-equation approach, a very effective and strong technique, to ensure the solutions for the Klein–Gordon featuring cubic nonlinearity and Zakharov Kuznetsov–Benjamin Bona Mahony equations. Several restriction requirements that ensure the existence of these solutions are emphasized. By employing a linearization technique, we ascertain the stability gain. This methodology acquires original precise solutions of soliton nature. Furthermore, the nonlinear wave structures of both equations are illustrated through the consideration of several three-dimensional and two-dimensional plots. These plots are generated by selecting appropriate values for the parameters. It is expected that these innovative solutions would facilitate an in-depth understanding of the evolution and fluidity of these models. The solutions obtained comprise periodic functions, mixed periodic functions, rational solutions, and exponential solutions. • Two nonlinear evolution equations. • Modified sub-equation method. • Exact solution. • Stability analysis.

Topics & Concepts

Nonlinear systemStability (learning theory)Statistical physicsPhysicsClassical mechanicsApplied mathematicsMathematicsComputer scienceQuantum mechanicsMachine learningNonlinear Waves and SolitonsNonlinear Photonic SystemsNumerical methods for differential equations
Theoretical examination and simulations of two nonlinear evolution equations along with stability analysis | Litcius