Lie Symmetry Analysis, Rogue Waves, and Lump Waves of Nonlinear Integral Jimbo–Miwa Equation

In this study, the extended (3 + 1)-dimensional Jimbo–Miwa equation, which has not been previously studied using Lie symmetry techniques, is the focus. We derive new symmetry reductions and exact invariant solutions, including lump and rogue wave structures. Additionally, precise solitary wave solut...

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Veröffentlicht in:Symmetry (Basel) Jg. 17; H. 10; S. 1717
Hauptverfasser: Hussain, Ejaz, Abdullah, Aljethi Reem, Farooq, Khizar, Shah, Syed Asif Ali
Format: Journal Article
Sprache:Englisch
Veröffentlicht: Basel MDPI AG 13.10.2025
Schlagworte:
Analysis
Behavior
Condensed matter physics
Entire functions
Fluid dynamics
Geophysics
Multivariate analysis
Nonlinear optics
Nonlinear phenomena
Optics
Partial differential equations
Physics
Plasma physics
Quantum mechanics
Rational functions
Solitary waves
Symmetry
Trigonometric functions
Water waves
ISSN:2073-8994, 2073-8994
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Zusammenfassung:In this study, the extended (3 + 1)-dimensional Jimbo–Miwa equation, which has not been previously studied using Lie symmetry techniques, is the focus. We derive new symmetry reductions and exact invariant solutions, including lump and rogue wave structures. Additionally, precise solitary wave solutions of the extended (3 + 1)-dimensional Jimbo–Miwa equation using the multivariate generalized exponential rational integral function technique (MGERIF) are studied. The extended (3 + 1)-dimensional Jimbo–Miwa equation is crucial for studying nonlinear processes in optical communication, fluid dynamics, materials science, geophysics, and quantum mechanics. The multivariate generalized exponential rational integral function approach offers advantages in addressing challenges involving exponential, hyperbolic, and trigonometric functions formulated based on the generalized exponential rational function method. The solutions provided by MGERIF have numerous applications in various fields, including mathematical physics, condensed matter physics, nonlinear optics, plasma physics, and other nonlinear physical equations. The graphical features of the generated solutions are examined using 3D surface graphs and contour plots, with theoretical derivations. This visual technique enhances our understanding of the identified answers and facilitates a more profound discussion of their practical applications in real-world scenarios. We employ the MGERIF approach to develop a technique for addressing integrable systems, providing a valuable framework for examining nonlinear phenomena across various physical contexts. This study’s outcomes enhance both nonlinear dynamical processes and solitary wave theory.
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ISSN:2073-8994
2073-8994
DOI:10.3390/sym17101717