| 李爱玲,吕梦婷.具有时变时滞惯性四元Hopfield神经网络反周期解的动力学研究[J].数学研究及应用,2021,41(5):461~472 |
| 具有时变时滞惯性四元Hopfield神经网络反周期解的动力学研究 |
| Dynamics of Anti-Periodic Solutions for Inertial Quaternion-Valued Hopfield Neural Networks with Time-Varying Delays |
| 投稿时间:2020-07-29 修订日期:2021-04-06 |
| DOI:10.3770/j.issn:2095-2651.2021.05.003 |
| 中文关键词: 反周期解 渐近稳定性 延拓定理 四元惯性神经网络 |
| 英文关键词:anti-periodic solution asymptotic stability continuation theorem Quaternion-valued inertial neural networks |
| 基金项目:2020年度省属高校基本科研业务费研究项目青年基金项目(Grant No.JYT2020030). |
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| 中文摘要: |
| 周期性、反周期性和概周期性是时变神经网络的重要动态行为特性.本文在不将所研究的神经网络分解为实值系统的情况下,根据重合度理论中的延拓定理和不等式技巧,通过构造不同于现有平衡点稳定性研究的李雅普诺夫函数,研究了一类具有变时滞的惯性四元Hopfield神经网络的反周期解的动力学问题,给出了上述神经网络反周期解存在的一个新的判别条件.并通过构造李雅普诺夫函数论证了上述神经网络反周期解的指数稳定性. |
| 英文摘要: |
| Periodicity, anti-periodicity and almost periodicity are significant dynamic behaviors of time-varying neural networks. This paper researches the dynamics of anti-periodic solutions for a kind of inertial Quaternion-valued Hopfield neural networks with varying-time delays. Without resolving the explored neural networks into real-valued systems, in the light of a continuation theorem of coincidence degree theory and inequality skills, by constructing different Lyapunov functions from those constructed in the existing research of the stability of equilibrium point, periodic solutions and anti-periodic solutions for neural networks, a newfangled sufficient condition insuring the existence of periodic solutions for above neural networks is gained. By constructing the same Lyapunov functions as those constructed in the proof of the existence of anti-periodic solutions, the newfangled asymptotic stability of anti-periodic solutions for above networks is acquired. |
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