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This paper shows how: i) (strongly) positive real; ii) (asymptotically stable) dissipative (strictly-input) passive; and iii) (L m 2 -stable strictly) positive; continuous time system definitions are equivalent for linear time invariant (LTI) systems. In parallel this paper shows how: i) (strictly) positive real; ii) (asymptotically stable) dissipative (strictly-input) passive; and iii) (l m 2 -stable strictly) positive; discrete time system definitions are equivalent for LTI systems. A frequency test is derived to determine if a single input single output LTI system is strictly output passive. Finally, the necessary conditions to synthesize a system which is both passive and stable but neither strictly-input passive nor strictly-output passive are presented.
Kottenstette et al. (Tue,) studied this question.