Title :
An asymptotic analysis of spherical subspace updating
Author :
DeGroat, Ronald D. ; Ye, Hao ; Dowling, Eric M.
Author_Institution :
Erik Jonsson Sch. of Eng. & Comput. Sci., Texas Univ., Richardson, TX, USA
Abstract :
We perform an asymptotic perturbation analysis of spherical subspace (SS) updating. Using eigen-based perturbation theory, we develop an asymptotic proof of convergence for two eigenlevel SS updating. We also show that SS convergence is dependent on the eigenvalue spread with the stronger/weaker eigenvectors in the sphericalized subspace converging more quickly/slowly than the corresponding components in an eigen update. By contrast, in rank-one eigen updating the rate of subspace convergence is uniform for all eigenvectors and the rate is independent of eigenvalue spread. We also show that a four level SS update can be combined with MDL to yield asymptotically consistent detection
Keywords :
convergence of numerical methods; eigenvalues and eigenfunctions; perturbation theory; signal detection; signal processing; MDL; asymptotic perturbation analysis; asymptotically consistent detection; eigen update; eigen-based perturbation theory; eigenvalue spread; eigenvectors; rank-one eigen updating; spherical subspace convergence; spherical subspace updating; Computer science; Convergence; Costs; Eigenvalues and eigenfunctions; Multiple signal classification; Noise level; Noise reduction; Performance analysis; Stochastic processes; White noise;
Conference_Titel :
Signals, Systems and Computers, 1993. 1993 Conference Record of The Twenty-Seventh Asilomar Conference on
Conference_Location :
Pacific Grove, CA
Print_ISBN :
0-8186-4120-7
DOI :
10.1109/ACSSC.1993.342531
