Litcius/Paper detail

Novel solitons and periodic wave solutions for Davey–Stewartson system with variable coefficients

Rehab M. El‐Shiekh, Mahmoud Gaballah

2020Journal of Taibah University for Science21 citationsDOIOpen Access PDF

Abstract

In this paper, the variable coefficients Davey–Stewartson system represents many physical phenomena in shallow water waves, quantum and optics, etc, is transformed directly into nonlinear ordinary differential system by using the new modification to the direct similarity reduction method. After solving the reduced system, new Jacobi, hyperbolic and periodic wave solutions are achieved for complex variable coefficients Davey–Stewartson system. The application of the new modification of the direct similarity reduction method reflects how this method is powerful, easy and simple, if it is compared with other symmetry techniques.

Topics & Concepts

MathematicsVariable (mathematics)Similarity (geometry)Nonlinear systemOrdinary differential equationSimple (philosophy)Reduction (mathematics)Symmetry (geometry)Mathematical analysisQuantumApplied mathematicsDifferential equationPhysicsGeometryComputer scienceQuantum mechanicsImage (mathematics)Artificial intelligenceEpistemologyPhilosophyNonlinear Waves and SolitonsNonlinear Photonic SystemsPhotonic Crystal and Fiber Optics