In this document, some general results in approximation theory and matrix analysis with applications to sparse identification of time series models and nonlinear discrete-time dynamical systems are presented. The aforementioned theoretical methods are translated into algorithms that can be used for sparse model identification of discrete-time dynamical systems, based on structured data measured from the systems. The approximation of the state-transition operators that are determined primarily by matrices of parameters to be identified based on data measured from a given system, is approached by identifying conditions for the existence of low-rank approximations of submatrices of the trajectory matrices corresponding to the measured data, that can be used to compute approximate sparse representations of the matrices of parameters. Prototypical algorithms based on the aforementioned techniques together with some applications to approximate identification and predictive simulation of time series models with symmetries and nonlinear structured dynamical systems in theoretical physics, fluid dynamics and weather forecasting are presented.
翻译:本文件介绍了近似理论和矩阵分析的一些一般结果,这些分析应用于分散地识别时间序列模型和非线性离散时间动态系统,上述理论方法被转化为算法,可用于根据从系统测量的结构性数据,对离散时间动态系统进行稀疏模式识别,主要根据从特定系统测量的数据确定参数矩阵确定的国家-过渡运营商的近似结果,方法是确定轨迹矩阵中与所测数据相对应的次矩阵低端近似值的条件,用于计算参数矩阵的近似稀少的表示;介绍了基于上述技术的准典型算法,以及理论物理学、流体动态和天气预报中以对称和非线性结构化动态系统估算的时间序列模型的近似识别和预测模拟的一些应用。