Control system design specifications are commonly given in terms of log-magnitude quantities (dB). This induces a multiplicative or relative error criterion for plant model reduction. Techniques from the theory of additive Hankel norm approximation and spectral factorization are synthesised to produce a multiplicative approximant of a possibly unstable or nonsquare plant. It is shown that the reduced-order model preserves the right half plane poles and zeros of the original system. Explicit state-space formulae are provided for the construction of the reduced order model and its error properties discussed.link_to_subscribed_fulltex
Balanced model reduction with a priori relative/multiplicative error bounds in L∞ norm is studied. I...
The problem of Hankel norm model reduction for discrete-time systems with time-varying state delay i...
The aim of this paper is to show how Chebycheff approximation may be used in frequency weighted ℋ∞ s...
A constrained Hankel-norm approximation problem is considered. The reduced-order model is required t...
AbstractConnections are established between Hankel-norm approximation, the problem of finding approx...
Connections are established between Hankel-norm approximation, the problem of finding approximating ...
Model reduction is an important engineering problem, in which one aims to replace an elaborate model...
Balanced truncation is studied for members of a certain class of linear multi-variable systems. For ...
[[abstract]]The best approximation in the optimal solution set of the Hankel-norm model reduction pr...
Includes bibliographical references (p. 34).Caption title.Research supported by a Harkness Fellowshi...
This paper considers the optimal model reduction problem of matrix second-order linear systems in th...
This paper is dedicated to model order reduction of linear time-invariant systems. The main contribu...
A mathematical formulation of the classical lead-lag design method leads to the same controller appr...
For linear control systems minimal realization theory and the related model reduction methods play a...
A self-contained derivation is presented of the characterization of all optimal Hankel-norm approxim...
Balanced model reduction with a priori relative/multiplicative error bounds in L∞ norm is studied. I...
The problem of Hankel norm model reduction for discrete-time systems with time-varying state delay i...
The aim of this paper is to show how Chebycheff approximation may be used in frequency weighted ℋ∞ s...
A constrained Hankel-norm approximation problem is considered. The reduced-order model is required t...
AbstractConnections are established between Hankel-norm approximation, the problem of finding approx...
Connections are established between Hankel-norm approximation, the problem of finding approximating ...
Model reduction is an important engineering problem, in which one aims to replace an elaborate model...
Balanced truncation is studied for members of a certain class of linear multi-variable systems. For ...
[[abstract]]The best approximation in the optimal solution set of the Hankel-norm model reduction pr...
Includes bibliographical references (p. 34).Caption title.Research supported by a Harkness Fellowshi...
This paper considers the optimal model reduction problem of matrix second-order linear systems in th...
This paper is dedicated to model order reduction of linear time-invariant systems. The main contribu...
A mathematical formulation of the classical lead-lag design method leads to the same controller appr...
For linear control systems minimal realization theory and the related model reduction methods play a...
A self-contained derivation is presented of the characterization of all optimal Hankel-norm approxim...
Balanced model reduction with a priori relative/multiplicative error bounds in L∞ norm is studied. I...
The problem of Hankel norm model reduction for discrete-time systems with time-varying state delay i...
The aim of this paper is to show how Chebycheff approximation may be used in frequency weighted ℋ∞ s...