Structure‐preserving interpolation of quadratic‐bilinear systems via regular multivariate transfer functions

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Abstract: For the accurate modeling of real‐world phenomena, high‐dimensional nonlinear dynamical systems are indispensable. Quadratic‐bilinear nonlinearities are of particular importance since many systems with general nonlinearities can be remodeled into this form. Such nonlinear systems typically encode physical properties via their internal differential structure. This leads to a high demand for structure‐preserving model order reduction techniques for quadratic‐bilinear systems that allow for the accurate representation of their dynamics by a small number of differential equations while retaining the internal system structure. In this paper, we provide formulae for structured regular subsystem transfer functions of quadratic‐bilinear systems with internal differential structures and provide a corresponding interpolation theory for the efficient construction of the resulting structured reduced‐order models. The presented theoretical results are illustrated in numerical experiments including a time‐delayed nonlinear reaction–diffusion equation and a molecular simulation.

Location
Deutsche Nationalbibliothek Frankfurt am Main
Extent
Online-Ressource
Language
Englisch

Bibliographic citation
Structure‐preserving interpolation of quadratic‐bilinear systems via regular multivariate transfer functions ; day:20 ; month:09 ; year:2024 ; extent:9
Proceedings in applied mathematics and mechanics ; (20.09.2024) (gesamt 9)

Creator
Benner, Peter
Gugercin, Serkan
Werner, Steffen W. R.

DOI
10.1002/pamm.202400048
URN
urn:nbn:de:101:1-2409201418247.838647268706
Rights
Open Access; Der Zugriff auf das Objekt ist unbeschränkt möglich.
Last update
15.08.2025, 7:22 AM CEST

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