The theory of polynomial matrices plays a key role in the design and analysis of multi-input multi-output control and communications systems using frequency domain methods. Examples include coprime factorizations of transfer functions, cannonical realizations from matrix fraction descriptions, and the transfer function design of feedback compensators. Typically, such problems abstract in a natural way to the need to solve systems of Diophantine equations or systems of linear equations over polynomials. These and other problems involving polynomial matrices can in turn be reduced to polynomial matrix triangularization procedures, a result which is not surprising given the importance of matrix triangularization techniques in numerical linear ...
AbstractA numerical elimination method is presented in this paper for floating-point computation in ...
The concept of polynomial matrices is introduced and the potential application of polynomial matrix ...
AbstractThis paper gives a classification for the triangular factorization of square matrices. These...
Polynomial matrices over fields and rings provide a unifying framework for many control system desig...
Polynomial matrix theory is very important to many automatic control related pro- blems. This thesis...
A unified approach is pursued for designing efficient and numerically reliable algorithms for polyno...
The application of symbolic computation to the algebraic design of linear multivariable control syst...
: Numerical procedures are proposed for triangularizing polynomial matrices over the field of polyno...
We review the complexity of polynomial and matrix computations, as well as their various correlation...
Quite recently the polynomial design methods found a new great field of application outside the cont...
In the process of eliminating variables in a symbolic polynomial system, the extraneous factors are ...
The author discusses a number of numerical linear algebra techniques for large scale problems in sys...
Dans cette thèse nous développons de nouveaux algorithmes de calcul numérique pour les matrices poly...
AbstractModern transfer function methods use quite a lot of abstract algebra in the design of contro...
AbstractComputational methods for manipulating sets of polynomial equations are becoming of greater ...
AbstractA numerical elimination method is presented in this paper for floating-point computation in ...
The concept of polynomial matrices is introduced and the potential application of polynomial matrix ...
AbstractThis paper gives a classification for the triangular factorization of square matrices. These...
Polynomial matrices over fields and rings provide a unifying framework for many control system desig...
Polynomial matrix theory is very important to many automatic control related pro- blems. This thesis...
A unified approach is pursued for designing efficient and numerically reliable algorithms for polyno...
The application of symbolic computation to the algebraic design of linear multivariable control syst...
: Numerical procedures are proposed for triangularizing polynomial matrices over the field of polyno...
We review the complexity of polynomial and matrix computations, as well as their various correlation...
Quite recently the polynomial design methods found a new great field of application outside the cont...
In the process of eliminating variables in a symbolic polynomial system, the extraneous factors are ...
The author discusses a number of numerical linear algebra techniques for large scale problems in sys...
Dans cette thèse nous développons de nouveaux algorithmes de calcul numérique pour les matrices poly...
AbstractModern transfer function methods use quite a lot of abstract algebra in the design of contro...
AbstractComputational methods for manipulating sets of polynomial equations are becoming of greater ...
AbstractA numerical elimination method is presented in this paper for floating-point computation in ...
The concept of polynomial matrices is introduced and the potential application of polynomial matrix ...
AbstractThis paper gives a classification for the triangular factorization of square matrices. These...