TY - JOUR
T1 - Subspace identification through blind source separation
AU - Grosse-Wentrup, Moritz
AU - Buss, Martin
PY - 2006/2
Y1 - 2006/2
N2 - Given a linear and instantaneous mixture model, we prove that for blind source separation (BSS) algorithms based on mutual information, only sources with non-Gaussian distribution are consistently reconstructed independent of initial conditions. This allows the identification of non-Gaussian sources and consequently the identification of signal and noise subspaces through BSS. The results are illustrated with a simple example, and the implications for a variety of signal processing applications, such as denoising and model identification, are discussed.
AB - Given a linear and instantaneous mixture model, we prove that for blind source separation (BSS) algorithms based on mutual information, only sources with non-Gaussian distribution are consistently reconstructed independent of initial conditions. This allows the identification of non-Gaussian sources and consequently the identification of signal and noise subspaces through BSS. The results are illustrated with a simple example, and the implications for a variety of signal processing applications, such as denoising and model identification, are discussed.
KW - Blind source separation (BSS)
KW - Consistency
KW - Denoising
KW - Identifiability
KW - Independent component (IC) analysis
KW - Independent components
KW - Model identification
KW - Noise
KW - Stability
KW - Subspace
UR - http://www.scopus.com/inward/record.url?scp=31344438447&partnerID=8YFLogxK
U2 - 10.1109/LSP.2005.861581
DO - 10.1109/LSP.2005.861581
M3 - Article
AN - SCOPUS:31344438447
SN - 1070-9908
VL - 13
SP - 100
EP - 103
JO - IEEE Signal Processing Letters
JF - IEEE Signal Processing Letters
IS - 2
ER -