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Schwarz lemma for driving point impedance functions and its circuit applications
(WILEY, 2019)
In this paper, a boundary version of the Schwarz lemma is investigated for driving point impedance functions and its circuit applications. It is known that driving point impedance function, Z(s) = 1 + c(p)(s - 1)(p) + c(p ...
Sharp Inequalities for Driving Point Impedance Functions
(Ieee-Inst Electrical Electronics Engineers Inc, 2023)
In this brief, positive real functions are considered as driving point impedance functions, Z(s), which are utilized in electrical engineering for characteristic representation of circuits. Accordingly, for the real part ...