Embedding Method by Real Numerical Algebraic Geometry for Structurally Unamenable Differential-Algebraic Equations

Pub Date : 2024-09-14 DOI:10.1007/s11424-024-4048-5
Wenqiang Yang, Wenyuan Wu, Greg Reid
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Abstract

Existing structural analysis methods may fail to identify all hidden constraints in systems of differential-algebraic equations with parameters, particularly when the system is structurally unamenable for certain parameter values. In this paper, the authors address numerical methods for polynomial systems of differential-algebraic equations using numerical real algebraic geometry to resolve such issues. Initially, the authors propose an embedding method that constructs an equivalent system with a full-rank Jacobian matrix for any given real analytic system. Secondly, the authors introduce a witness point method, which assists in detecting the constant rank of a component of the constraints in such systems. Finally, these two methods lead to a comprehensive numerical global structural analysis method for polynomial differential-algebraic equations across all components of constraints.

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用实数代数几何嵌入法处理结构上不可通约的微分代数方程
现有的结构分析方法可能无法识别带参数的微分代数方程系统中的所有隐藏约束,尤其是当系统在结构上对某些参数值无法修正时。在本文中,作者利用数值实代数几何解决了微分代数方程多项式系统的数值方法问题。首先,作者提出了一种嵌入方法,可以为任何给定的实解析系统构建一个具有全秩雅各布矩阵的等价系统。其次,作者介绍了一种见证点方法,该方法有助于检测此类系统中约束部分的恒定秩。最后,这两种方法为多项式微分代数方程提供了一种全面的全局结构数值分析方法,适用于所有约束成分。
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