Model order reduction of fully parameterized systems by recursive least square optimization

Zheng Zhang, I. Elfadel, L. Daniel
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引用次数: 5

Abstract

This paper presents an approach for the model order reduction of fully parameterized linear dynamic systems. In a fully parameterized system, not only the state matrices, but also can the input/output matrices be parameterized. The algorithm presented in this paper is based on neither conventional moment-matching nor balanced-truncation ideas. Instead, it uses “optimal (block) vectors” to construct the projection matrix, such that the system errors in the whole parameter space are minimized. This minimization problem is formulated as a recursive least square (RLS) optimization and then solved at a low cost. Our algorithm is tested by a set of multi-port multi-parameter cases with both intermediate and large parameter variations. The numerical results show that high accuracy is guaranteed, and that very compact models can be obtained for multi-parameter models due to the fact that the ROM size is independent of the number of parameters in our approach.
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基于递归最小二乘优化的全参数化系统模型降阶
提出了一种全参数化线性动态系统模型阶数约简方法。在全参数化系统中,不仅状态矩阵可以参数化,输入/输出矩阵也可以参数化。本文提出的算法既不是基于传统的矩匹配思想,也不是基于平衡截断思想。相反,它使用“最优(块)向量”来构造投影矩阵,从而使整个参数空间中的系统误差最小化。该最小化问题被表述为递归最小二乘优化,然后以低成本求解。我们的算法通过一组多端口多参数中、大参数变化的案例进行了测试。数值结果表明,由于该方法中ROM大小与参数数量无关,可以保证较高的精度,并且对于多参数模型可以得到非常紧凑的模型。
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