Decomposition of the Controllability and Observability Matrices Into Symmetrical and Asymmetrical Parts in Linear Electrical Circuits
AbstractDecomposition of the controllability and observability matrices into symmetrical and asymmetrical parts of electrical circuits composed of resistors, coils, capacitors and voltage sources are addressed. It is shown that: 1) the Metzler matrix is Hurwitz if and only if its symmetrical part is Hurwitz; 2) if the linear electrical circuit is controllable (observable) then at least its symmetrical or asymmetrical part is controllable (observable).
|Publication size in sheets||0.5|
|Book||2019 IEEE 20th International Conference on Computational Problems of Electrical Engineering (CPEE), 2019, Institute of Electrical and Electronics Engineers, ISBN 978-1-7281-2810-8, 290 p., DOI:10.1109/CPEE47179.2019|
|Internal identifier||ROC 19-20|
|Score||= 0.0, 22-01-2020, ChapterFromConference|
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