Litcius/Paper detail

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

Umair Ali, Muhammad Naeem, Reham A. Alahmadi, Farah Aini Abdullah, Muhammad Asim Khan, Abdul Hamid Ganie

2023Frontiers in Physics11 citationsDOIOpen Access PDF

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-order ordinary differential equation (ODE) from the proposed equation. Also, new exact solutions as kink- and periodic-type solutions for non-linear space–time variable-order fractional shallow water wave equations were constructed. This confirms that the non-linear fractional variable-order evolution equations are natural and very attractive in mathematical physics.

Topics & Concepts

Fractional calculusMathematicsVariable (mathematics)Mathematical analysisOrdinary differential equationOdeOrder (exchange)Wave equationSpace (punctuation)Transformation (genetics)Differential equationApplied mathematicsComputer scienceBiochemistryEconomicsChemistryGeneFinanceOperating systemNonlinear Waves and SolitonsFractional Differential Equations SolutionsNonlinear Photonic Systems