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Development of spreading symmetric two-waves motion for a family of two-mode nonlinear equations

Marwan Alquran, Imad Jaradat, Mohammed Ali, Nadeem Al-Ali, Shaher Momani

2020Heliyon18 citationsDOIOpen Access PDF

Abstract

In this work, a functional operator extracted from Korsunsky's technique is used to produce new two-mode nonlinear equations. These new equations describe the motion of two directional solitary-waves overlapping with an increasing phase-velocity and affected by two factors labeled as the dispersion and nonlinearity coefficients. To investigate the dynamics of this two-mode family, we construct the two-mode KdV-Burgers-Kuramoto equation (TMKBK) and two-mode Hirota-Satsuma model (TMHS). Two efficient schemes are used to assign the necessary constraints for existence of solutions and to extract them. The role of the phase-velocity on the motion of the obtained two-wave solutions is investigated graphically. Finally, all the obtained solutions are categorized according to their physical shapes.

Topics & Concepts

Korteweg–de Vries equationNonlinear systemMode (computer interface)Motion (physics)Dispersion (optics)Mathematical analysisOperator (biology)Equations of motionWork (physics)Phase (matter)MathematicsClassical mechanicsPhysicsOpticsComputer scienceGeneRepressorOperating systemTranscription factorThermodynamicsChemistryQuantum mechanicsBiochemistryNonlinear Waves and SolitonsNonlinear Photonic SystemsAdvanced Mathematical Physics Problems
Development of spreading symmetric two-waves motion for a family of two-mode nonlinear equations | Litcius