不确定离散线性分数阶系统的有限时间测度稳定性

IF 1.9 4区 数学 Q1 MATHEMATICS Mathematical Sciences Pub Date : 2022-07-06 DOI:10.1007/s40096-022-00484-y
Qinyun Lu, Yuanguo Zhu
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引用次数: 0

摘要

随着数学理论的发展,分数阶方程正在成为神经网络研究的一个潜在工具。本文主要研究由线性分数阶不确定差分方程控制的系统的稳定性,它可以很好地描述神经网络。首先,给出了这些线性差分方程的解。其次,给出了系统有限时间测度稳定性的定义。并利用分数阶差分的性质和不确定性理论,给出了检验其正确性的充分条件。此外,还讨论了有限时间稳定与测度稳定之间的关系。最后,对数值算例进行了分析。
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Finite-time stability in measure for nabla uncertain discrete linear fractional order systems

With the development of mathematical theory, fractional order equation is becoming a potential tool in the context of neural networks. This paper primarily concerns with the stability for systems governed by the linear fractional order uncertain difference equations, which may properly portray neural networks. First, the solutions of these linear difference equations are provided. Secondly, the definition of finite-time stability in measure for the proposed systems is introduced. Furthermore, some sufficient conditions checking for it are achieved by the property of fractional order difference and uncertainty theory. Besides, the relationship between finite-time stability almost surely and in measure is discussed. Finally, some numerical examples are analysed by employing the proposed results.

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来源期刊
CiteScore
4.20
自引率
5.00%
发文量
44
期刊介绍: Mathematical Sciences is an international journal publishing high quality peer-reviewed original research articles that demonstrate the interaction between various disciplines of theoretical and applied mathematics. Subject areas include numerical analysis, numerical statistics, optimization, operational research, signal analysis, wavelets, image processing, fuzzy sets, spline, stochastic analysis, integral equation, differential equation, partial differential equation and combinations of the above.
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