New fractional results for Langevin equations through extensive fractional operators
Copyright policy )New fractional results for Langevin equations through extensive fractional operators
<abstract><p>Fractional Langevin equations play an important role in describing a wide range of physical processes. For instance, they have been used to describe single-file predominance and the behavior of unshackled particles propelled by internal sounds. This article investigates fractional Langevin equations incorporating recent extensive fractional operators of different orders. Nonperiodic and nonlocal integral boundary conditions are assumed for the model. The Hyres-Ulam stability, existence, and uniqueness of the solution are defined and analyzed for the suggested equations. Also, we utilize Banach contraction principle and Krasnoselskii fixed point theorem to accomplish our results. Moreover, it will be apparent that the findings of this study include various previously obtained results as exceptional cases.</p></abstract>
- King Khalid University Saudi Arabia
- University of Tabuk Saudi Arabia
- Al Azhar University Egypt
- Qassim University Saudi Arabia
hyres-ulam stability, nonlocal conditions, Theory and Applications of Fractional Differential Equations, Mathematical analysis, Langevin equation, Machine learning, QA1-939, FOS: Mathematics, fractional langevin equation, Fixed-point theorem, Stability (learning theory), Boundary value problem, Anomalous Diffusion Modeling and Analysis, Applied Mathematics, Physics, Fractional calculus, Pure mathematics, extensive fractional integral operator, Fixed point, Applied mathematics, Computer science, fixed point theorems, Nonlocal Partial Differential Equations and Boundary Value Problems, Fractional Derivatives, Modeling and Simulation, Physical Sciences, Uniqueness, Statistical physics, Mathematics
hyres-ulam stability, nonlocal conditions, Theory and Applications of Fractional Differential Equations, Mathematical analysis, Langevin equation, Machine learning, QA1-939, FOS: Mathematics, fractional langevin equation, Fixed-point theorem, Stability (learning theory), Boundary value problem, Anomalous Diffusion Modeling and Analysis, Applied Mathematics, Physics, Fractional calculus, Pure mathematics, extensive fractional integral operator, Fixed point, Applied mathematics, Computer science, fixed point theorems, Nonlocal Partial Differential Equations and Boundary Value Problems, Fractional Derivatives, Modeling and Simulation, Physical Sciences, Uniqueness, Statistical physics, Mathematics
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