Litcius/Paper detail

Computational Analysis of Fractional Diffusion Equations Occurring in Oil Pollution

Jagdev Singh, Ahmed Alshehri, Shaher Momani, Samir Hadid, Devendra Kumar

2022Mathematics17 citationsDOIOpen Access PDF

Abstract

The fractional model of diffusion equations is very important in the study of oil pollution in the water. The key objective of this article is to analyze a fractional modification of diffusion equations occurring in oil pollution associated with the Katugampola derivative in the Caputo sense. An effective and reliable computational method q-homotopy analysis generalized transform method is suggested to obtain the solutions of fractional order diffusion equations. The results of this research are demonstrated in graphical and tabular descriptions. This study shows that the applied computational technique is very effective, accurate, and beneficial for managing such kind of fractional order nonlinear models occurring in oil pollution.

Topics & Concepts

Fractional calculusNonlinear systemPollutionDiffusionOil pollutionApplied mathematicsHomotopy analysis methodMathematicsDerivative (finance)Order (exchange)Computer scienceHomotopyEnvironmental scienceEnvironmental engineeringThermodynamicsPure mathematicsPhysicsEcologyQuantum mechanicsFinancial economicsBiologyEconomicsFinanceFractional Differential Equations SolutionsIterative Methods for Nonlinear EquationsMathematical and Theoretical Epidemiology and Ecology Models