AbstractIn order reduction of large-scale linear time invariant systems, Krylov subspace methods based on moment matching are among the best choices today. However, in many technical fields, models typically consist of sets of second-order differential equations, and Krylov subspace methods cannot directly be applied. Two methods for solving this problem are presented in this paper: (1) an approach by Su and Craig is generalized and the number of matching moments is increased; (2) a new approach via first-order models is presented, resulting in an even higher number of matching moments. Both solutions preserve the specific structure of the second-order type model
Reduced order models (ROMs) based on the asymptotic waveform evaluation enable fast and efficient pa...
In this work we investigate the application of some model order reduction techniques, based on Krylo...
Numerical solution of dynamical systems have been a successful means for studying complex physical p...
AbstractIn order reduction of large-scale linear time invariant systems, Krylov subspace methods bas...
AbstractExisting Krylov subspace-based structure-preserving model order reduction methods for the se...
AbstractIn this paper, we propose a model reduction algorithm for approximation of large-scale linea...
AbstractIn this paper we introduce an approximation method for model reduction of large-scale dynami...
AbstractA simple, yet powerful approach to model order reduction of large-scale linear dynamical sys...
This thesis focuses on the model reduction of linear systems and the solution of large scale linear...
This paper describes the use of Krylov subspace methods in the model reduction of power systems. Add...
AbstractIn this paper we study numerical methods for the model-order reduction of large-scale biline...
Abstract. We present two efcient algorithms to produce a reduced order model of a time-invariant lin...
We present two efficient algorithms to produce a reduced order model of a time-invariant linear dyna...
Model reduction for Linear dynamical system can be done by Krylov subspace method. In this paper, we...
In this chapter, the problem of constructing a reduced order system while preserving the second orde...
Reduced order models (ROMs) based on the asymptotic waveform evaluation enable fast and efficient pa...
In this work we investigate the application of some model order reduction techniques, based on Krylo...
Numerical solution of dynamical systems have been a successful means for studying complex physical p...
AbstractIn order reduction of large-scale linear time invariant systems, Krylov subspace methods bas...
AbstractExisting Krylov subspace-based structure-preserving model order reduction methods for the se...
AbstractIn this paper, we propose a model reduction algorithm for approximation of large-scale linea...
AbstractIn this paper we introduce an approximation method for model reduction of large-scale dynami...
AbstractA simple, yet powerful approach to model order reduction of large-scale linear dynamical sys...
This thesis focuses on the model reduction of linear systems and the solution of large scale linear...
This paper describes the use of Krylov subspace methods in the model reduction of power systems. Add...
AbstractIn this paper we study numerical methods for the model-order reduction of large-scale biline...
Abstract. We present two efcient algorithms to produce a reduced order model of a time-invariant lin...
We present two efficient algorithms to produce a reduced order model of a time-invariant linear dyna...
Model reduction for Linear dynamical system can be done by Krylov subspace method. In this paper, we...
In this chapter, the problem of constructing a reduced order system while preserving the second orde...
Reduced order models (ROMs) based on the asymptotic waveform evaluation enable fast and efficient pa...
In this work we investigate the application of some model order reduction techniques, based on Krylo...
Numerical solution of dynamical systems have been a successful means for studying complex physical p...