Analysis of mathematical model involving nonlinear systems of Caputo–Fabrizio fractional differential equation

In this work, we present a new concept of additive‐Jensen s‐functional equations, where s is a constant complex number with |s| < 1, and solve them as two classes of additive functions. We then indicate that they are ‐linear mappings on Lie algebras. Following this, we define generalized Lie bracket derivations between Lie algebras. Then, we investigate the properties of Jordan on Lie bracket of derivations such that we show that the condition of Jordan Lie bracket derivation‐derivation does not hold, but the condition of Lie bracket of Jordan derivations does hold. Ultimately, by using the fixed point theorem, we investigate the Hyers–Ulam stability of additive‐Jensen s‐functional equations and generalized Lie bracket derivations on Lie algebras with two control functions of Găvruta and Rassias.

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Solution analysis for non-linear fractional differential equations

Kebede,

Guezane Lakoud,

Yesuf

2024

Front. Appl. Math. Stat.

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In this research study, two new types of fractional derivatives, the Caputo-Fabrizio derivative that does not involve a singular kernel (like the Riemann–Liouville derivative), which helps in eliminating some drawbacks, such as non-locality, and the Atangana–Baleanu–Caputo (ABC) derivative that uses a non-singular and non-local kernel, offering different characteristics from other fractional derivatives and often leading to more accurate models in certain physical systems, are used. The primary goal of the research is to analyze a non-linear fractional differential equation involving the fractional derivatives of Caputo–Fabrizio and ABC admit at least one solution. Fixed point theory is a fundamental tool in mathematical analysis used to prove the existence of solutions to various equations. Hence, in this study, to achieve the desired results, we employ a novel fixed point theory known as the F-contraction type. The study also includes required conditions and inequalities that need to be satisfied to ensure that a solution exists. One of these conditions is based on the Lipschitz hypothesis. Therefore, we provide the required conditions and inequalities, based on the Lipschitz hypothesis, to show that solutions to our problem exist. Furthermore, we provide two illustrative examples to support our primary findings.

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Analysis of mathematical model involving nonlinear systems of Caputo–Fabrizio fractional differential equation

Cited by 3 publications

References 27 publications

Existence and stability of solution for time-delayed nonlinear fractional differential equations

Existence and stability of solution for time-delayed nonlinear fractional differential equations

Hyers–Ulam Stability of Solution for Generalized Lie Bracket of Derivations

Solution analysis for non-linear fractional differential equations

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