Fractional Difference, Differential Equations, and Inclusions: Analysis and Stability is devoted to the existence and stability (Ulam-Hyers-Rassias stability and asymptotic stability) of solutions for several classes of functional fractional difference equations and inclusions. Covered equations include delay effects of finite, infinite, or state-dependent nature, and tools used to establish the existence results for the proposed problems include fixed point theorems, densifiability techniques, monotone iterative technique, notions of Ulam stability, attractivity and the measure of non-compactness, as well as the measure of weak noncompactness. The tools of fractional calculus are found to be of great utility in improving the mathematical modeling of many natural phenomena and processes occurring in the areas of engineering, social, natural, and biomedical sciences. All abstract results in the book are illustrated by examples in applied mathematics, engineering, biomedical, and other applied sciences.
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Table of Contents
1. Preliminary Background2. Caputo Fractional Difference Equations in Banach Spaces
3. Caputo Fractional Difference Inclusions
4. Ulam Stability for Fractional Difference Equations
5. Impulsive Fractional Difference Equations
6. Coupled Fractional Difference Systems
7. Coupled Caputo-Hadamard Fractional Differential Systems in Generalized Banach Spaces
8. Coupled Hilfer-Hadamard Fractional Differential Systems in Generalized Banach Spaces
9. Oscillation and Nonoscillation Results for Fractional q-Difference Equations and Inclusions
10. A Filippov's Theorem and Topological Structure of Solution Sets for Fractional q-Difference Inclusions
11. On ? -Caputo Fractional Differential Equations in Banach Spaces
12. Ulam Stability for ? -Caputo Fractional Differential Equations and Systems
13. Monotone Iterative Technique for psi-Caputo Fractional Differential Equations