In this paper a novel model order reduction method for nonlinear systems is proposed. Differently from existing ones, the proposed method provides a suitable non-linear projection, which we refer to as control-oriented deep autoencoder (CoDA), in an easily implementable manner. This is done by combining noise response data based model reduction, whose control theoretic optimality was recently proven by the author, with stacked autoencoder design via deep learning
Nonlinear state-space identification for dynamical systems is most often performed by minimizing the...
A new approach to model order reduction of nonlinear control systems is aimed at developing persiste...
We design a physics-aware auto-encoder to specifically reduce the dimensionality of solutions arisin...
In analyzing and assessing the condition of dynamical systems, it is necessary to account for nonlin...
In analyzing and assessing the condition of dynamical systems, it is necessary to account for nonlin...
We introduce a data-driven order reduction method for nonlinear control systems, drawing on recent p...
Model reduction of high-dimensional dynamical systems alleviates computational burdens faced in vari...
In this paper, we develop data-driven model reduction methods for monotone nonlinear control systems...
Higher-level representations (macromodels, reduced-order models) abstract away unnecessary implement...
Model order reduction (MOR) is a very powerful technique that is used to deal with the increasing co...
This thesis presents two nonlinear model reduction methods for systems of equations. One model utili...
The identification of a nonlinear dynamic model is an open topic in control theory, especially from ...
The Kolmogorov $n$-width of the solution manifolds of transport-dominated problems can decay slowly....
The identification of a nonlinear dynamic model is an open topic in control theory, especially from ...
This work explores the physics-driven machine learning technique Operator Inference (OpInf) for pred...
Nonlinear state-space identification for dynamical systems is most often performed by minimizing the...
A new approach to model order reduction of nonlinear control systems is aimed at developing persiste...
We design a physics-aware auto-encoder to specifically reduce the dimensionality of solutions arisin...
In analyzing and assessing the condition of dynamical systems, it is necessary to account for nonlin...
In analyzing and assessing the condition of dynamical systems, it is necessary to account for nonlin...
We introduce a data-driven order reduction method for nonlinear control systems, drawing on recent p...
Model reduction of high-dimensional dynamical systems alleviates computational burdens faced in vari...
In this paper, we develop data-driven model reduction methods for monotone nonlinear control systems...
Higher-level representations (macromodels, reduced-order models) abstract away unnecessary implement...
Model order reduction (MOR) is a very powerful technique that is used to deal with the increasing co...
This thesis presents two nonlinear model reduction methods for systems of equations. One model utili...
The identification of a nonlinear dynamic model is an open topic in control theory, especially from ...
The Kolmogorov $n$-width of the solution manifolds of transport-dominated problems can decay slowly....
The identification of a nonlinear dynamic model is an open topic in control theory, especially from ...
This work explores the physics-driven machine learning technique Operator Inference (OpInf) for pred...
Nonlinear state-space identification for dynamical systems is most often performed by minimizing the...
A new approach to model order reduction of nonlinear control systems is aimed at developing persiste...
We design a physics-aware auto-encoder to specifically reduce the dimensionality of solutions arisin...