DocumentCode
1059901
Title
An Intrinsic Metric for Power Spectral Density Functions
Author
Georgiou, Tryphon T.
Author_Institution
Minnesota Univ., Mineapolis
Volume
14
Issue
8
fYear
2007
Firstpage
561
Lastpage
563
Abstract
We present an intrinsic metric that quantifies distances between power spectral density functions. The metric was derived by Georgiou as the geodesic distance between spectral density functions with respect to a particular pseudo-Riemannian metric motivated by a quadratic prediction problem. We provide an independent verification of the metric inequality and discuss certain key properties of the induced topology.
Keywords
geometry; spectral analysis; geodesic distance; intrinsic metric; power spectral density functions; pseudo-Riemannian metric; quadratic prediction problem; Arithmetic; Density functional theory; Frequency; Geometry; Geophysics computing; H infinity control; Root mean square; Stochastic processes; Topology; Information geometry; intrinsic metric; power spectral density functions;
fLanguage
English
Journal_Title
Signal Processing Letters, IEEE
Publisher
ieee
ISSN
1070-9908
Type
jour
DOI
10.1109/LSP.2006.891315
Filename
4276732
Link To Document