分数阶流行病模型的有限时间动力学：稳定性、同步性和模拟

Q1 Mathematics Chaos, Solitons and Fractals: X Pub Date : 2024-07-15 DOI:10.1016/j.csfx.2024.100118

Iqbal M. Batiha , Osama Ogilat , Issam Bendib , Adel Ouannas , Iqbal H. Jebril , Nidal Anakira

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摘要

本文旨在探讨分数阶流行反应扩散系统特定子集中的有限时间同步性。首先，我们引入了一个新的有限时间稳定性(finite-time stability)lemma，该lemma扩展了现有的标准，并以之前的发现为基础。随后，我们设计了有效的与状态相关的线性控制器。通过利用 Lyapunov 函数，我们得出了新的充分条件，以确保在预定义的时间框架内实现有限时间同步。最后，我们通过数值模拟来证明所提技术的适用性和有效性。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Finite-time dynamics of the fractional-order epidemic model: Stability, synchronization, and simulations

The aim of this paper is to explore finite-time synchronization in a specific subset of fractional-order epidemic reaction–diffusion systems. Initially, we introduce a new lemma for finite-time stability, which extends existing criteria and builds upon previous discoveries. Following this, we design effective state-dependent linear controllers. By utilizing a Lyapunov function, we derive new sufficient conditions to ensure finite-time synchronization within a predefined time frame. Lastly, we present numerical simulations to demonstrate the applicability and effectiveness of the proposed technique.

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