Algorithms for nonorthogonal approximate joint block-diagonalization

Author

Tichavsky, P. ; Koldovsky, Z.

Author_Institution

Inst. of Inf. Theor. & Autom., Prague, Czech Republic

fYear

2012

fDate

27-31 Aug. 2012

Firstpage

2094

Lastpage

2098

Abstract

Approximate joint block diagonalization (AJBD) of a set of matrices has applications in blind source separation, e.g., when the signal mixtures contain mutually independent subspaces of dimension higher than one. In this paper we present three novel AJBD algorithms which differ in the final target criterion to be minimized in the optimization process. Two of the algorithms extend the principle of Jacobi elementary rotations to the more general concept of matrix elementary rotations. The proposed algorithms are compared to existing state-of-the art AJBD algorithms.

Keywords

Jacobian matrices; approximation theory; blind source separation; minimisation; Jacobi elementary rotations; blind source separation; matrix elementary rotations; mutually independent subspaces; nonorthogonal AJBD algorithms; nonorthogonal approximate joint block-diagonalization algorithms; optimization process; signal mixtures; Approximation algorithms; Covariance matrix; Jacobian matrices; Joints; Manganese; Signal processing algorithms; Signal to noise ratio; Source separation; independent subspaces;

fLanguage

English

Publisher

ieee

Conference_Titel

Signal Processing Conference (EUSIPCO), 2012 Proceedings of the 20th European

Conference_Location

Bucharest

ISSN

2219-5491

Print_ISBN

978-1-4673-1068-0

Type

conf

Filename

6334026