Residual dynamic mode decomposition with control for nonlinear dynamic systems
摘要
The Koopman theory has received increasing attention for constructing reduced-order models (ROMs) as it converts a nonlinear dynamical system to a linear one in a higher-dimensional space. This ability to rapidly and unintrusively model nonlinear dynamics yields a promising system identification method for digital twins (DTs), which often handle large amounts of highly nonlinear data. However, conventional ROMs based on Koopman are often made more complicated and sometimes inaccurate by unnecessary spurious eigenvalue-eigenvector pairs. This paper leverages the recent method of residual dynamic mode decomposition (ResDMD) for autonomous systems, and extends its