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Lie symmetry analysis, explicit solutions, and conservation laws of the time-fractional Fisher equation in two-dimensional space

Rawya Al‐deiakeh, Omar Abu Arqub, Mohammed Al‐Smadi, Shaher Momani

2021Journal of Ocean Engineering and Science19 citationsDOIOpen Access PDF

Abstract

In these analyses, we consider the time-fractional Fisher equation in two-dimensional space. Through the use of the Riemann-Liouville derivative approach, the well-known Lie point symmetries of the utilized equation are derived. Herein, we overturn the fractional fisher model to a fractional differential equation of nonlinear type by considering its Lie point symmetries. The diminutive equation's derivative is in the Erdélyi-Kober sense, whilst we use the technique of the power series to conclude explicit solutions for the diminutive equations for the first time. The conservation laws for the dominant equation are built using a novel conservation theorem. Several graphical countenances were utilized to award a visual performance of the obtained solutions. Finally, some concluding remarks and future recommendations are utilized.

Topics & Concepts

Conservation lawMathematicsHomogeneous spaceSymmetry (geometry)Fractional calculusPartial differential equationMathematical analysisSpace (punctuation)Fisher's equationFisher equationType (biology)Differential equationFirst-order partial differential equationExact differential equationComputer scienceGeometryOperating systemEcologyBiologyReal interest rateEconomicsInterest rateMonetary economicsFractional Differential Equations SolutionsNonlinear Waves and SolitonsAdvanced Differential Equations and Dynamical Systems
Lie symmetry analysis, explicit solutions, and conservation laws of the time-fractional Fisher equation in two-dimensional space | Litcius