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Existence, Stability and Simulation of a Class of Nonlinear Fractional Langevin Equations Involving Nonsingular Mittag–Leffler Kernel

Kaihong Zhao

2022Fractal and Fractional29 citationsDOIOpen Access PDF

Abstract

The fractional Langevin equation is a very effective mathematical model for depicting the random motion of particles in complex viscous elastic liquids. This manuscript is mainly concerned with a class of nonlinear fractional Langevin equations involving nonsingular Mittag–Leffler (ML) kernel. We first investigate the existence and uniqueness of the solution by employing some fixed-point theorems. Then, we apply direct analysis to obtain the Ulam–Hyers (UH) type stability. Finally, the theoretical analysis and numerical simulation of some interesting examples show that there is a great difference between the fractional Langevin equation and integer Langevin equation in describing the random motion of free particles.

Topics & Concepts

Langevin equationInvertible matrixUniquenessKernel (algebra)MathematicsNonlinear systemStability (learning theory)Mathematical analysisFractional calculusStatistical physicsApplied mathematicsPhysicsPure mathematicsQuantum mechanicsComputer scienceMachine learningFractional Differential Equations SolutionsNonlinear Differential Equations AnalysisNumerical methods for differential equations
Existence, Stability and Simulation of a Class of Nonlinear Fractional Langevin Equations Involving Nonsingular Mittag–Leffler Kernel | Litcius