Novel periodic and optical soliton solutions for Davey–Stewartson system by generalized Jacobi elliptic expansion method
Mahmoud Gaballah, Rehab M. El‐Shiekh, Lanre Akinyemi, Hadi Rezazadeh
Abstract
Abstract As Davey–Stewartson system is considered one of the most important models in optics, quantum physics, plasmas, and Bose–Einstein condensates. In this study, we have solved the Davey–Stewartson system using a modified Jacobi elliptic function methodology, and therefore many novel Jacobi elliptic wave function solutions were obtained, which degenerated to hypergeometric functions and periodic functions. The results obtained in this paper are novel in addition, contain other results achieved before in literatures. Moreover, some dynamic behavior for the periodic, kink type, and soliton wave propagation is demonstrated.
Topics & Concepts
Elliptic functionJacobi elliptic functionsSolitonElliptic integralPeriodic waveHypergeometric functionTheta functionMathematicsMathematical analysisPhysicsMathematical physicsNonlinear systemQuantum mechanicsTraveling waveNonlinear Waves and SolitonsNonlinear Photonic SystemsAdvanced Fiber Laser Technologies