Title :
Application of Riemannian mean of covariance matrices to space-time adaptive processing
Author :
Balaji, Bhashyam ; Barbaresco, F.
Author_Institution :
Radar Syst., Defence R& D Canada - Ottawa, Ottawa, ON, Canada
fDate :
Oct. 31 2012-Nov. 2 2012
Abstract :
The application of space-time adaptive processing to airborne GMTI radar data requires estimation of the covariance matrix. Among many novel results in the radar signal processing context, it has been shown that the usual sample covariance matrix based STAP approaches are suboptimal in that they are in the Euclidean space, rather than a natural Riemannian space of symmetric cones. In this paper, the algorithms of Riemannian mean based on the Karcher barycenter is shown to provide dramatically improved performance over the classic sample matrix inversion (SMI) technique.
Keywords :
airborne radar; covariance matrices; radar signal processing; space-time adaptive processing; Euclidean space; Karcher barycenter; Riemannian mean; airborne GMTI radar data; covariance matrix estimation; radar signal processing context; sample matrix inversion; space-time adaptive processing; symmetric cones; Covariance matrix; Geometry; Measurement; Signal processing algorithms; Spaceborne radar; Symmetric matrices; Karcher barycenter; Riemannian geometry; STAP;
Conference_Titel :
Radar Conference (EuRAD), 2012 9th European
Conference_Location :
Amsterdam
Print_ISBN :
978-1-4673-2471-7
