Title :
Multiple sequence matrix pencil analysis
Author :
Sheeyun Park ; Sarkar, T.K.
Author_Institution :
Dept. of Electr. Eng. & Comput. Sci., Syracuse Univ., NY, USA
Abstract :
The matrix pencil is a well known technique used to fit data as a sum of complex exponentials. The technique estimates the poles of the system, then solves a least squares problem for the amplitudes of the poles. This paper details an extension of the matrix pencil technique to match poles simultaneously to several data sequences which should have the same poles but may have differing amplitudes, some of which may be zero, associated with the poles. These sequences may arise from different excitations of a structure or from viewing scattering information from different directions.
Keywords :
electromagnetic wave scattering; estimation theory; least squares approximations; matrix algebra; poles and zeros; EM scattering information; complex exponentials; data sequences; least squares problem; matrix pencil analysis; multiple sequence; poles amplitudes; poles estimation; poles matching; Amplitude estimation; Damping; Least squares approximation; Matrix decomposition; Noise shaping; Polarization; Poles and zeros; Sampling methods; Scattering;
Conference_Titel :
Antennas and Propagation Society International Symposium, 1997. IEEE., 1997 Digest
Conference_Location :
Montreal, Quebec, Canada
Print_ISBN :
0-7803-4178-3
DOI :
10.1109/APS.1997.631579
