Title :
A generalization of the positive real lemma
Author :
Scherer, Rudolf ; Wendler, Werner
Author_Institution :
Inst. fur Praktische Math., Karlsruhe Univ., Germany
fDate :
4/1/1994 12:00:00 AM
Abstract :
The positive real lemma (also called the Kalman-Yacubovich-Popov lemma) characterizes the positive realness of the transfer function matrix of a linear dynamic system by algebraic conditions. In the case of a pole-zero cancellation appearing in the transfer function matrix, or in other words, missing the assumptions of controllability and observability, there exist generalized versions, which are discussed and proven applying the Kalman canonical decomposition
Keywords :
linear systems; matrix algebra; poles and zeros; transfer functions; Kalman canonical decomposition; Kalman-Yacubovich-Popov lemma; algebraic conditions; linear dynamic system; pole-zero cancellation appearing; positive real lemma; positive realness; transfer function matrix; Automatic control; Control system analysis; Control system synthesis; Control systems; Digital filters; Feedback; Periodic structures; Riccati equations; Sampling methods; Time varying systems;
Journal_Title :
Automatic Control, IEEE Transactions on
