An investigation of a closed-form solution for non-linear variable-order fractional evolution equations via the fractional Caputo derivative

Abstract: Determining the non-linear traveling or soliton wave solutions for variable-order fractional evolution equations (VO-FEEs) is very challenging and important tasks in recent research fields. This study aims to discuss the non-linear space–time variable-order fractional shallow water wave equation that represents non-linear dispersive waves in the shallow water channel by using the Khater method in the Caputo fractional derivative (CFD) sense. The transformation equation can be used to get the non-linear integer… Show more

“…Several processes in physics, chemistry, engineering and other disciplines can be accurately modeled using fractional calculus. Moreover, fractional calculus is often used to represent a variety of viscoelastic materials frequency-dependent damping behavior [4], the dynamics of nanoparticle-substrate interfaces [5], economics [6], and much more [7,8,9,10].…”

Novel Analysis of Nonlinear Seventh Order Kaup-Kupershmidt Equation via the Caputo Operator

“…Several processes in physics, chemistry, engineering and other disciplines can be accurately modeled using fractional calculus. Moreover, fractional calculus is often used to represent a variety of viscoelastic materials frequency-dependent damping behavior [4], the dynamics of nanoparticle-substrate interfaces [5], economics [6], and much more [7,8,9,10].…”

Novel Analysis of Nonlinear Seventh Order Kaup-Kupershmidt Equation via the Caputo Operator

A highly effective analytical approach to innovate the novel closed form soliton solutions of the Kadomtsev–Petviashivili equations with applications

A higher order unconditionally stable numerical technique for multi-term time-fractional diffusion and advection–diffusion equations