Richards' theorem

Due to Paul I. Richards, 1947.

Richards' theorem states that for,

${\displaystyle R(s)={\frac {kZ(s)-sZ(k)}{kZ(k)-sZ(s)}}}$

if ${\displaystyle Z(s)}$ is a positive-real function (PRF) then ${\displaystyle R(s)}$ is a PRF for all real, positive values of ${\displaystyle k}$.^[1]

<note>Is this an extension of Richards' original statement?</note>

Let,

${\displaystyle W(s)={1-{\dfrac {Z(s)}{Z(k)}} \over 1+{\dfrac {Z(s)}{Z(k)}}}\left({\frac {k+s}{k-s}}\right)}$

where ${\displaystyle Z(s)}$ is a PRF and k is a positive real constant.

Since ${\displaystyle Z(s)}$ is PRF then

${\displaystyle 1+{\dfrac {Z(s)}{Z(k)}}}$

is also PRF. The [zero (complex analysis)|zeroes]] of this function are the poles of ${\displaystyle W(s)}$. Since a PRF can have no zeroes in the right-half s-plane, then ${\displaystyle W(s)}$ can have no poles in the right-half s-plane and hence is analytic in the right-half s-plane.

^[2]

Richards' theorem can also be derived from Schwarz's lemma.^[3]

As used in Bott-Duffin synthesis,

• Wing, Omar, Classical Circuit Theory, Springer, 2008 ISBN 0387097406.

• Bott, Raoul; Duffin, Richard, "Impedance synthesis without use of transformers", Journal of Applied Physics, vol. 20, iss. 8, p. 816, August 1949.
• Hubbard, John H., "The Bott-Duffin synthesis of electrical circuits", pp. 33–40 in, Kotiuga, P. Robert (ed), A Celebration of the Mathematical Legacy of Raoul Bott, American Mathematical Society, 2010 ISBN 9780821883815.
• Richards, Paul I., "A special class of functions with positive real part in a half-plane", Duke Mathematical Journal, vol. 14, no. 3, 777–786, 1947.