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MCSS
2007
Springer
2007
Springer
Minimal symmetric Darlington synthesis
We consider the symmetric Darlington synthesis of a p × p rational symmetric Schur function S with the constraint that the extension is of size 2p×2p. Under the assumption that S is strictly contractive in at least one point of the imaginary axis, we determine the minimal McMillan degree of the extension. In particular, we show that it is generically given by the number of zeros of odd multiplicity of Ip − SS∗. A constructive characterization of all such extensions is provided in terms of a symmetric realization of S and of the outer spectral factor of Ip − SS∗. The authors’s motivation for the problem stems from Surface Acoustic Wave filters where physical constraints on the electro-acoustic scattering matrix naturally raise this mathematical issue. Keywords. symmetric Darlington synthesis, inner extension, MacMillan degree, Riccati equation, symmetric Potapov factorization.
Real-time TrafficControl Systems | MCSS 2007 | Rational Symmetric Schur | Symmetric | Symmetric Darlington Synthesis |
| Added | 16 Dec 2010 |
| Updated | 16 Dec 2010 |
| Type | Journal |
| Year | 2007 |
| Where | MCSS |
| Authors | Laurent Baratchart, P. Enqvist, A. Gombani, M. Olivi |
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