This work develops a technique for constructing a reduced-order system that not only has low computational complexity, but also maintains the stability of the original nonlinear dynamical system. The proposed framework is designed to preserve the contractivity of the vector field in the original system, which can further guarantee stability preservation, as well as provide an error bound for the approximated equilibrium solution of the resulting reduced system. This technique employs a low-dimensional basis from proper orthogonal decomposition to optimally capture the dominant dynamics of the original system, and modifies the discrete empirical interpolation method by enforcing certain structure for the nonlinear approximation. The efficien...
We provide a unifying projection-based framework for structure-preserving interpolatory model reduct...
We propose a new model reduction framework for problems that exhibit transport phenomena. As in the ...
In this work, we introduced extended differential balancing, which is a model reduction approach for...
This work develops a technique for constructing a reduced-order system that not only has low computa...
The problem of model order reduction plays a mayor role in engineering as the complexity and the dim...
The analysis of system models forms an important tool in the design of high-tech systems. However, t...
System simplification is, by far, the most common theme behind various techniques available for the ...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/70...
Model order reduction (MOR) is a very powerful technique that is used to deal with the increasing co...
This paper presents a new method for generating a reduced-order model of a linear time-invariant SIS...
In almost every field of applied science and engineering, dynamical models are widely used as a prof...
Model order reduction appears to be beneficial for the synthesis and simulation of compliant mechani...
Abstract. This work proposes a model-reduction methodology that preserves Lagrangian structure (equi...
Mathematical models of networked systems usually take the form of large-scale, nonlinear differentia...
Modal derivative is an approach to compute a reduced basis for model order reduction of large-scale ...
We provide a unifying projection-based framework for structure-preserving interpolatory model reduct...
We propose a new model reduction framework for problems that exhibit transport phenomena. As in the ...
In this work, we introduced extended differential balancing, which is a model reduction approach for...
This work develops a technique for constructing a reduced-order system that not only has low computa...
The problem of model order reduction plays a mayor role in engineering as the complexity and the dim...
The analysis of system models forms an important tool in the design of high-tech systems. However, t...
System simplification is, by far, the most common theme behind various techniques available for the ...
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/70...
Model order reduction (MOR) is a very powerful technique that is used to deal with the increasing co...
This paper presents a new method for generating a reduced-order model of a linear time-invariant SIS...
In almost every field of applied science and engineering, dynamical models are widely used as a prof...
Model order reduction appears to be beneficial for the synthesis and simulation of compliant mechani...
Abstract. This work proposes a model-reduction methodology that preserves Lagrangian structure (equi...
Mathematical models of networked systems usually take the form of large-scale, nonlinear differentia...
Modal derivative is an approach to compute a reduced basis for model order reduction of large-scale ...
We provide a unifying projection-based framework for structure-preserving interpolatory model reduct...
We propose a new model reduction framework for problems that exhibit transport phenomena. As in the ...
In this work, we introduced extended differential balancing, which is a model reduction approach for...