Boundary value problem for Caputo-Fabrizio random fractional differential equations
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Publication:6491222
DOI10.2478/MJPAA-2020-0017WikidataQ115227889 ScholiaQ115227889MaRDI QIDQ6491222
Mouffak Benchohra, Fouzia Bekada, Saïd Abbas
Publication date: 24 April 2024
Published in: Moroccan Journal of Pure and Applied Analysis (Search for Journal in Brave)
fixed pointfractional differential equationCaputo-Fabrizio fractional derivativeUlam stabilityrandom solutionCaputo-Fabrizio integral of fractional order
Related Items (2)
Caputo-Fabrizio fractional differential equations with non instantaneous impulses ⋮ Dynamics and stability for Katugampola random fractional differential equations
Cites Work
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- New stability results for fractional integral equation
- Topics in fractional differential equations
- New concepts and results in stability of fractional differential equations
- Hyers-Ulam-Rassias stability of functional equations in nonlinear analysis
- Fractional dynamics. Applications of fractional calculus to dynamics of particles, fields and media
- Random fixed point theorems with an application to random differential equations in Banach spaces
- Caputo-Hadamard fractional differential equations in Banach spaces
- Existence of mild solutions for a class of Hilfer fractional evolution equations with nonlocal conditions
- Ulam stability for Hilfer type fractional differential inclusions via the weakly Picard operators theory
- A fixed point approach to the stability of a Volterra integral equation
- Ulam stability and data dependence for fractional differential equations with Caputo derivative
- Boundary value problems for nonlinear ordinary differential equations of second order in Banach spaces
- On the Stability of the Linear Mapping in Banach Spaces
- Implicit Fractional Differential and Integral Equations
- Ulam Stability for Partial Fractional Differential Inclusions via Picard Operators Theory
- Basic Theory of Fractional Differential Equations
- On the Stability of the Linear Functional Equation
- Stability of functional equations in several variables
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