Some Remarks on Positive Real Functions and Their Circuit Applications
Abstract
In this paper, a boundary version of the Schwarz lemma has been considered for driving point impedance functions
at
s = 0
point of the imaginary axis. Accordingly, under
Z(0) 0 =
condition, the modulus of the derivative of
the
Z s( )
function has been considered from below. Here,
Z( ) a ,
1
c
and
2
c
coefficients of the Taylor expansion
of the
( ) ... 1
( )
p
Z s c s = + - + b a
function have been used in the obtained inequalities. The sharpness of these
inequalities has also been proved. Using the obtained driving point impedance functions in the proposed theorems,
corresponding LC circuits have been synthesized and related figures have been presented.
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