Polynomial matrices over fields and rings provide a unifying framework for many control system design problems. These include dynamic compensator design, infinite dimensional systems, controllers for nonlinear systems, and even controllers for discrete event systems. An important obstacle for utilizing these powerful mathematical tools in practical applications has been the non-availability of efficient and fast algorithms to carry through the precise error-free computations required by these algebraic methods. Recently, with the advent of computer algebra this has become possible. In this paper we develop highly efficient, error-free algorithms, for most of the important computations needed in linear systems over fields or rings. We show t...
International audienceIn this paper, we show how stabilizing controllers for 2D systems can effectiv...
In recent years a number of algorithms have been designed for the "inverse" computational ...
The author discusses a number of numerical linear algebra techniques for large scale problems in sys...
The theory of polynomial matrices plays a key role in the design and analysis of multi-input multi-o...
Polynomial matrix theory is very important to many automatic control related pro- blems. This thesis...
The computational algebra techniques described in this paper constitute a tool, efficient and easy t...
Linear algebra, together with polynomial arithmetic, is the foundation of computer algebra. The algo...
We review the complexity of polynomial and matrix computations, as well as their various correlation...
The Computational Algebra techniques described in this paper are a tool efficient and easy to implem...
Linear delay differential systems can be modeled as systems with coefficients in a suitable ring, so...
Linear delay differential systems can be modeled as systems with coefficients in a suitable ring, so...
(eng) We study the link between the complexity of polynomial matrix multiplication and the complexit...
In this correspondence, we will establish polynomial algorithms for computation of controllers in th...
In this correspondence, we will establish polynomial algorithms for computation of controllers in th...
In this paper, computational methods to test the reach ability and stabilizability of a system over ...
International audienceIn this paper, we show how stabilizing controllers for 2D systems can effectiv...
In recent years a number of algorithms have been designed for the "inverse" computational ...
The author discusses a number of numerical linear algebra techniques for large scale problems in sys...
The theory of polynomial matrices plays a key role in the design and analysis of multi-input multi-o...
Polynomial matrix theory is very important to many automatic control related pro- blems. This thesis...
The computational algebra techniques described in this paper constitute a tool, efficient and easy t...
Linear algebra, together with polynomial arithmetic, is the foundation of computer algebra. The algo...
We review the complexity of polynomial and matrix computations, as well as their various correlation...
The Computational Algebra techniques described in this paper are a tool efficient and easy to implem...
Linear delay differential systems can be modeled as systems with coefficients in a suitable ring, so...
Linear delay differential systems can be modeled as systems with coefficients in a suitable ring, so...
(eng) We study the link between the complexity of polynomial matrix multiplication and the complexit...
In this correspondence, we will establish polynomial algorithms for computation of controllers in th...
In this correspondence, we will establish polynomial algorithms for computation of controllers in th...
In this paper, computational methods to test the reach ability and stabilizability of a system over ...
International audienceIn this paper, we show how stabilizing controllers for 2D systems can effectiv...
In recent years a number of algorithms have been designed for the "inverse" computational ...
The author discusses a number of numerical linear algebra techniques for large scale problems in sys...