Structural identifiability analysis of nonlinear time delayed systems with generalized frequency response functions

IF 0.9 4区 计算机科学 Q4 COMPUTER SCIENCE, CYBERNETICS Kybernetika Pub Date : 2022-01-30 DOI:10.14736/kyb-2021-6-0939
Gergely Szlobodnyik, G. Szederkényi
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引用次数: 1

Abstract

In this paper a novel method is proposed for the structural identifiability analysis of nonlinear time delayed systems. It is assumed that all the nonlinearities are analytic functions and the time delays are constant. We consider the joint structural identifiability of models with respect to the ordinary system parameters and time delays by including delays into a unified parameter set. We employ the Volterra series representation of nonlinear dynamical systems and make use of the frequency domain representations of the Volterra kernels, i. e. the Generalized Frequency Response Functions (GFRFs), in order to test the unique computability of the parameters. The advantage of representing nonlinear systems with their GFRFs is that in the frequency domain representation the time delay parameters appear explicitly in the exponents of complex exponential functions from which they can be easily extracted. Since the GFRFs can be symmetrized to be unique, they provide us with an exhaustive summary of the underlying model structure. We use the GFRFs to derive equations for testing structural identifiability. Unique solution of the composed equations with respect to the parameters provides sufficient conditions for structural identifiability. Our method is illustrated on non-linear dynamical system models of different degrees of non-linearities and multiple time delayed terms. Since Volterra series representation can be applied for input-output models, it is also shown that after differential algebraic elimination of unobserved state variables, the proposed method can be suitable for identifiability analysis of a more general class of non-linear time delayed state space models.
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广义频响函数非线性时滞系统的结构可辨识性分析
提出了一种非线性时滞系统结构可辨识性分析的新方法。假定所有非线性均为解析函数,且时滞为常数。通过将时滞纳入一个统一的参数集,考虑了模型关于普通系统参数和时滞的联合结构可辨识性。我们采用非线性动力系统的Volterra级数表示,并利用Volterra核的频域表示,即广义频率响应函数(GFRFs),以测试参数的唯一可计算性。用非线性系统的gfrf表示非线性系统的优点是,在频域表示中,时间延迟参数显式地出现在复指数函数的指数中,可以很容易地从中提取。由于gfrf可以对称为唯一,因此它们为我们提供了对底层模型结构的详尽总结。我们使用GFRFs来推导测试结构可识别性的方程。组合方程关于参数的唯一解为结构的可辨识性提供了充分条件。我们的方法在不同程度的非线性和多时滞项的非线性动力系统模型上得到了说明。由于Volterra级数表示可以用于输入输出模型,因此还表明,在微分代数消除不可观测状态变量后,所提出的方法可以适用于更一般的一类非线性时滞状态空间模型的可辨识性分析。
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来源期刊
Kybernetika
Kybernetika 工程技术-计算机:控制论
CiteScore
1.30
自引率
20.00%
发文量
38
审稿时长
6 months
期刊介绍: Kybernetika is the bi-monthly international journal dedicated for rapid publication of high-quality, peer-reviewed research articles in fields covered by its title. The journal is published by Nakladatelství Academia, Centre of Administration and Operations of the Czech Academy of Sciences for the Institute of Information Theory and Automation of The Czech Academy of Sciences. Kybernetika traditionally publishes research results in the fields of Control Sciences, Information Sciences, Statistical Decision Making, Applied Probability Theory, Random Processes, Operations Research, Fuzziness and Uncertainty Theories, as well as in the topics closely related to the above fields.
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