DocumentCode
3026760
Title
The geometry of the partial realization problem
Author
Brockett, R.W.
Author_Institution
Harvard University, Cambridge, Massachusetts
fYear
1979
fDate
10-12 Jan. 1979
Firstpage
1048
Lastpage
1052
Abstract
In this paper we show that the space of sequences of length n which have an extrapolation of McMillan degree k, and no extrapolations of lower Millan degree can be given the structure of a differentiable manifold. Our approach makes the proof of certain known results on the partial realization problem quite straightforward and allows us to establish some important new results as well. A key tool is the fact, proven here, that the set of n by n real Hankel matrices of rank r is a manifold with r+1 connected components.
Keywords
Geometry; Hydrogen;
fLanguage
English
Publisher
ieee
Conference_Titel
Decision and Control including the 17th Symposium on Adaptive Processes, 1978 IEEE Conference on
Conference_Location
San Diego, CA, USA
Type
conf
DOI
10.1109/CDC.1978.268090
Filename
4046277
Link To Document