Title :
Generalized systems: pencils, modules, and pole spaces
Author :
Schrader, Cheryl B.
Author_Institution :
Div. of Eng., Texas Univ., San Antonio, TX, USA
Abstract :
A bridge between generalized system representations and module theory is provided. By means of a theorem, the little pole space associated with a generalized system is shown to be isomorphic to the global system pole space, a module-theoretic concept incorporating both finite and infinite system pole information. These results hold true for any regular matrix pencil (zE-A), and may be interpreted as special cases in terms of causal and anticausal systems. An illustration of the theorem using the Weierstrass form is given
Keywords :
matrix algebra; modules; poles and zeros; system theory; Weierstrass form; anticausal systems; causal systems; generalized system representations; module-theoretic concept; modules; pencils; pole spaces; regular matrix; Bridges; Differential algebraic equations; H infinity control; Marine vehicles; Mathematical model; Poles and zeros; Polynomials; Tellurium;
Conference_Titel :
Decision and Control, 1992., Proceedings of the 31st IEEE Conference on
Conference_Location :
Tucson, AZ
Print_ISBN :
0-7803-0872-7
DOI :
10.1109/CDC.1992.371576
