{"title":"基于欧拉近似和一阶滤波器的采样数据非线性系统的神经学习控制","authors":"Dengxiang Liang, Min Wang","doi":"10.1002/rnc.7609","DOIUrl":null,"url":null,"abstract":"The primary focus of this research paper is to explore the realm of dynamic learning in sampled‐data strict‐feedback nonlinear systems (SFNSs) by leveraging the capabilities of radial basis function (RBF) neural networks (NNs) under the framework of adaptive control. First, the exact discrete‐time model of the continuous‐time system is expressed as an Euler strict‐feedback model with a sampling approximation error. We provide the consistency condition that establishes the relationship between the exact model and the Euler model with meticulous detail. Meanwhile, a novel lemma is derived to show the stability condition of a digital first‐order filter. To address the non‐causality issues of SFNSs with sampling approximation error and the input data dimension explosion of NNs, the auxiliary digital first‐order filter and backstepping technology are combined to propose an adaptive neural dynamic surface control (ANDSC) scheme. Such a scheme avoids the ‐step time delays associated with the existing NN updating laws derived by the common ‐step predictor technology. A rigorous recursion method is employed to provide a comprehensive verification of the stability, guaranteeing its overall performance and dependability. Following that, the NN weight error systems are systematically decomposed into a sequence of linear time‐varying subsystems, allowing for a more detailed analysis and understanding. In order to ensure the recurrent nature of the input variables, a recursive design is employed, thereby satisfying the partial persistent excitation condition specifically designed for the RBF NNs. Meanwhile, it can verify that the NN estimated weights converge to their ideal values. Compared with the common ‐step predictor technology, there is no need to redesign the learning rules due to the designed NN weight updating laws without time delays. Subsequently, after capturing and storing the convergence weights, a novel neural learning dynamic surface control (NLDSC) scheme is specifically formulated by leveraging the acquired knowledge. The introduced methodology reduces computational complexity and facilitates practical implementation. Finally, empirical evidence obtained from simulation experiments validates the efficacy and viability of the proposed methodology.","PeriodicalId":50291,"journal":{"name":"International Journal of Robust and Nonlinear Control","volume":"34 1","pages":""},"PeriodicalIF":3.2000,"publicationDate":"2024-08-26","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":"{\"title\":\"Neural learning control for sampled‐data nonlinear systems based on Euler approximation and first‐order filter\",\"authors\":\"Dengxiang Liang, Min Wang\",\"doi\":\"10.1002/rnc.7609\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"The primary focus of this research paper is to explore the realm of dynamic learning in sampled‐data strict‐feedback nonlinear systems (SFNSs) by leveraging the capabilities of radial basis function (RBF) neural networks (NNs) under the framework of adaptive control. 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Following that, the NN weight error systems are systematically decomposed into a sequence of linear time‐varying subsystems, allowing for a more detailed analysis and understanding. In order to ensure the recurrent nature of the input variables, a recursive design is employed, thereby satisfying the partial persistent excitation condition specifically designed for the RBF NNs. Meanwhile, it can verify that the NN estimated weights converge to their ideal values. Compared with the common ‐step predictor technology, there is no need to redesign the learning rules due to the designed NN weight updating laws without time delays. Subsequently, after capturing and storing the convergence weights, a novel neural learning dynamic surface control (NLDSC) scheme is specifically formulated by leveraging the acquired knowledge. The introduced methodology reduces computational complexity and facilitates practical implementation. 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引用次数: 0
摘要
本研究论文的主要重点是在自适应控制框架下,利用径向基函数(RBF)神经网络(NN)的功能,探索采样数据严格反馈非线性系统(SFNS)的动态学习领域。首先,连续时间系统的精确离散时间模型被表达为具有采样近似误差的欧拉严格反馈模型。我们提供了建立精确模型与欧拉模型之间关系的一致性条件,并对其进行了详细说明。同时,我们还推导出了一个新颖的 Lemma 来说明数字一阶滤波器的稳定性条件。针对采样近似误差 SFNS 的非因果性问题和 NN 的输入数据维数爆炸问题,将辅助数字一阶滤波器和反步进技术相结合,提出了一种自适应神经动态表面控制(ANDSC)方案。这种方案避免了现有由普通步进预测器技术推导出的神经网络更新规律所带来的步进时间延迟。采用严格的递归方法对稳定性进行了全面验证,保证了其整体性能和可靠性。随后,NN 权重误差系统被系统地分解为一系列线性时变子系统,以便进行更详细的分析和理解。为了确保输入变量的递归性,采用了递归设计,从而满足了专门为 RBF NN 设计的部分持续激励条件。同时,它还能验证 NN 估计权重收敛到理想值。与普通的步进预测技术相比,由于设计了无时间延迟的 NN 权重更新规律,因此无需重新设计学习规则。随后,在捕获并存储收敛权重后,利用所获得的知识专门制定了一种新型神经学习动态表面控制(NLDSC)方案。所引入的方法降低了计算复杂度,便于实际应用。最后,通过模拟实验获得的经验证据验证了所提方法的有效性和可行性。
Neural learning control for sampled‐data nonlinear systems based on Euler approximation and first‐order filter
The primary focus of this research paper is to explore the realm of dynamic learning in sampled‐data strict‐feedback nonlinear systems (SFNSs) by leveraging the capabilities of radial basis function (RBF) neural networks (NNs) under the framework of adaptive control. First, the exact discrete‐time model of the continuous‐time system is expressed as an Euler strict‐feedback model with a sampling approximation error. We provide the consistency condition that establishes the relationship between the exact model and the Euler model with meticulous detail. Meanwhile, a novel lemma is derived to show the stability condition of a digital first‐order filter. To address the non‐causality issues of SFNSs with sampling approximation error and the input data dimension explosion of NNs, the auxiliary digital first‐order filter and backstepping technology are combined to propose an adaptive neural dynamic surface control (ANDSC) scheme. Such a scheme avoids the ‐step time delays associated with the existing NN updating laws derived by the common ‐step predictor technology. A rigorous recursion method is employed to provide a comprehensive verification of the stability, guaranteeing its overall performance and dependability. Following that, the NN weight error systems are systematically decomposed into a sequence of linear time‐varying subsystems, allowing for a more detailed analysis and understanding. In order to ensure the recurrent nature of the input variables, a recursive design is employed, thereby satisfying the partial persistent excitation condition specifically designed for the RBF NNs. Meanwhile, it can verify that the NN estimated weights converge to their ideal values. Compared with the common ‐step predictor technology, there is no need to redesign the learning rules due to the designed NN weight updating laws without time delays. Subsequently, after capturing and storing the convergence weights, a novel neural learning dynamic surface control (NLDSC) scheme is specifically formulated by leveraging the acquired knowledge. The introduced methodology reduces computational complexity and facilitates practical implementation. Finally, empirical evidence obtained from simulation experiments validates the efficacy and viability of the proposed methodology.
期刊介绍:
Papers that do not include an element of robust or nonlinear control and estimation theory will not be considered by the journal, and all papers will be expected to include significant novel content. The focus of the journal is on model based control design approaches rather than heuristic or rule based methods. Papers on neural networks will have to be of exceptional novelty to be considered for the journal.