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http://dspace.univ-relizane.dz/home/handle/123456789/988| Title: | Existence and Uniqueness of Solutions for Impulsive Fractional Partial Differential Equation Boundary Value Problems with theψ−Caputo Derivative under the Weak Topology. |
| Authors: | Zineb BELLABES |
| Keywords: | Caputo fractional derivative Riemann-Liouville fractional derivative vari- able order impulsive differential equations, thermistor problem weak topology De Blasi measure of weak non-compactness Pet- tis integral |
| Issue Date: | 2025 |
| Abstract: | In this thesis, we study existence, uniqueness, and stability results for several classes of fractional differential equations in Banach spaces. We consider initial value problems for sequentialψ-Caputo fractional Langevin equations, boundary value problems involving impulses with power law kernels, a variable order Caputo thermistor model, and variable order Riemann-Liouville boundary value problems with multi-point data. The analysis is carried out in the weak topology framework using the Pettis integral, the De Blasi mea- sure of weak noncompactness, and fixed-point theorems of M¨onch, Schauder, Banach con- traction, and Krasnoselskii. Existence is proved via M¨onch’s theorem, uniqueness via the Banach contraction principle, and generalized Ulam-Hyers-Rassias stability is established. For the variable order thermistor problem, existence and uniqueness are obtained by split- ting the order into piecewise constant subintervals and applying Schauder’s and Banach’s theorems. For the Riemann-Liouville problem, the method of upper and lower solutions combined with Schauder’s theorem yields positive solutions in a fractional Sobolev space. Numerical examples illustrate the theoretical findings |
| URI: | http://dspace.univ-relizane.dz/home/handle/123456789/988 |
| Appears in Collections: | Sciences et Technologies |
Files in This Item:
| File | Description | Size | Format | |
|---|---|---|---|---|
| Existence and Uniqueness of Solutions for Impulsive Fractional Partial Differential .pdf | 1.19 MB | Adobe PDF | View/Open |
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