On Weighted Fractional Operators with Applications to Mathematical Models Arising in Physics
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Date
2023
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Abstract
In recent study, we develop the weighted generalized Hilfer-Prabhakar fractional derivative operator and explore its key properties. It unifies many existing fractional derivatives like Hilfer-Prabhakar and Riemann-Liouville. The weighted Laplace transform of the newly defined derivative is obtained. By involving the new fractional derivative, we modeled the free-electron laser equation and kinetic equation and then found the solutions of these fractional equations by applying the weighted Laplace transform.
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Fractional Kinetic Equation, Free-Electron Laser Equation, Weighted Hilfer-Prabhakar Fractional Derivative, Weighted Laplace Transform
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Samraiz, Muhammad;...et.al. "On Weighted Fractional Operators with Applications to Mathematical Models Arising in Physics", Advances in Mathematical Modelling, Applied Analysis and Computation, ICMMAAC 2022, Proceedings, pp.53-68, 2023.
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Advances in Mathematical Modelling, Applied Analysis and Computation, ICMMAAC 2022
Volume
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53
Start Page
68