In 1933, Brune was working on his doctoral thesis entitled,
Synthesis of Passive Networks and Cauer suggested that he provide a proof of the necessary and sufficient conditions for the realisability of multi-port impedances. Cauer himself had found a necessary condition but had failed to prove it to be sufficient. The goal for researchers then was "to remove the restrictions implicit in the Foster-Cauer realisations and find conditions on Z equivalent to realisability by a network composed of arbitrary interconnections of positive-valued R, C and L." Brune coined the term
positive-real (PR) for that class of
analytic functions that are realisable as an electrical network using passive components. He did not only introduce the mathematical characterization of this function in one complex variable but also demonstrated "the necessity and sufficiency for the realization of driving point functions of lumped, linear, finite, passive, time-invariant and bilateral network. Brune also showed that if the case is limited to scalar PR functions then there was no other theoretical reason that required ideal transformers in the realisation (transformers limit the practical usefulness of the theory), but was unable to show (as others later did) that transformers can always be avoided. The eponymous
Brune cycle continued fractions were invented by Brune to facilitate this proof. The Brune theorem is: • The impedance
Z(
s) of any electric network composed of passive components is positive-real. • If
Z(
s) is positive-real it is realisable by a network having as components passive (positive) R, C, L, and ideal transformers T. Brune is also responsible for the
Brune test for determining the permissibility of interconnecting
two-port networks. == Legacy ==