Litcius/Paper detail

Traveling wave solutions of Fordy–Gibbons equation

Adem C. Çevikel

2024Modern Physics Letters B13 citationsDOI

Abstract

The Fordy–Gibbons equation is a nonlinear differential equation. Physically, the motion of a damped oscillator with a more complex potential than in basic harmonic motion is described by the Fordy–Gibbons equation. For the equation under consideration, numerous novel families of precise analytical solutions are being successfully found. The soliton solutions are represented as rational and exponential functions. To further illustrate the potential and physical behavior of the equation, the findings are also stated visually. Three approaches are suggested in this paper for solving the Fordy–Gibbons equation. These solutions are new solutions.

Topics & Concepts

Traveling waveWave equationPhysicsClassical mechanicsComputer scienceMathematical analysisMathematicsNonlinear Waves and SolitonsFractional Differential Equations SolutionsNonlinear Photonic Systems
Traveling wave solutions of Fordy–Gibbons equation | Litcius