Invariant subspaces, exact solutions and classification of conservation laws for a coupled (1+1)-dimensional nonlinear Wu-Zhang equation

Abstract: In this work, we apply the invariant subspace method to derive a set of invariant subspaces and solutions of the nonlinear Wu–Zhang equation which describes the dynamic behavior of dispersive long waves in fluid dynamics. The method gives logarithmic and polynomial solutions of the equation. Furthermore, the multipliers approach and new conservation theorem are employed to derive a set of conservation laws of the equation which are to the best of our knowledge reported for the first time in this work. The phys… Show more

“…e differential model has a broad application in many phenomena as in [12][13][14]. Recently, nonlinear fractional differential equations (NLFDEs) show significantly in engineering and applications of other sciences, for example, electrochemistry, physics, electromagnetics, and signal data processing [15][16][17][18][19][20][21][22].…”

Analytical Solutions for Nonlinear Dispersive Physical Model

“…e differential model has a broad application in many phenomena as in [12][13][14]. Recently, nonlinear fractional differential equations (NLFDEs) show significantly in engineering and applications of other sciences, for example, electrochemistry, physics, electromagnetics, and signal data processing [15][16][17][18][19][20][21][22].…”

Analytical Solutions for Nonlinear Dispersive Physical Model

Optical Solitons of Two Non-linear Models in Birefringent Fibres Using Extended Direct Algebraic Method

On the exact solutions to Biswas–Arshed equation involving truncated M-fractional space-time derivative terms