二次线性系统多元传递函数的结构插值

IF 1.7 3区 数学 Q2 MATHEMATICS, APPLIED
Peter Benner, Serkan Gugercin, Steffen W. R. Werner
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引用次数: 0

摘要

当我们的目标是精确模拟现实世界的现象时,高维/高保真非线性动力学系统就自然而然地出现了。许多物理特性因此被编码在这些由此产生的大规模非线性系统的内部微分结构中。动力学的高维度会造成计算瓶颈,尤其是当这些大规模系统需要针对不同情况(如不同的强迫项)进行模拟时。这就需要对模型进行还原,目的是用精确的低阶代用模型取代全阶动力学模型。基于插值的模型还原已被证明是一种有效的工具,可用于构建在弱非线性情况下保持内部结构的低成本评估代用模型。在本文中,我们考虑为结构化二次线性系统构建频域多元插值。我们提出了二次线性系统对称子系统和广义传递函数结构变体的定义,并提供了通过投影进行结构保留插值的条件。我们用两个数值示例(包括晶体结构中的分子动力学模拟)来说明理论结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Structured interpolation for multivariate transfer functions of quadratic-bilinear systems

High-dimensional/high-fidelity nonlinear dynamical systems appear naturally when the goal is to accurately model real-world phenomena. Many physical properties are thereby encoded in the internal differential structure of these resulting large-scale nonlinear systems. The high dimensionality of the dynamics causes computational bottlenecks, especially when these large-scale systems need to be simulated for a variety of situations such as different forcing terms. This motivates model reduction where the goal is to replace the full-order dynamics with accurate reduced-order surrogates. Interpolation-based model reduction has been proven to be an effective tool for the construction of cheap-to-evaluate surrogate models that preserve the internal structure in the case of weak nonlinearities. In this paper, we consider the construction of multivariate interpolants in frequency domain for structured quadratic-bilinear systems. We propose definitions for structured variants of the symmetric subsystem and generalized transfer functions of quadratic-bilinear systems and provide conditions for structure-preserving interpolation by projection. The theoretical results are illustrated using two numerical examples including the simulation of molecular dynamics in crystal structures.

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来源期刊
CiteScore
3.00
自引率
5.90%
发文量
68
审稿时长
3 months
期刊介绍: Advances in Computational Mathematics publishes high quality, accessible and original articles at the forefront of computational and applied mathematics, with a clear potential for impact across the sciences. The journal emphasizes three core areas: approximation theory and computational geometry; numerical analysis, modelling and simulation; imaging, signal processing and data analysis. This journal welcomes papers that are accessible to a broad audience in the mathematical sciences and that show either an advance in computational methodology or a novel scientific application area, or both. Methods papers should rely on rigorous analysis and/or convincing numerical studies.
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