A General Algebraic Algorithm for Blind Extraction of One Source in a MIMO Convolutive Mixture
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Marc Castella | Eric Moreau | Christophe De Luigi | Rémi Dubroca | E. Moreau | M. Castella | C. D. Luigi | R. Dubroca
[1] J. Pesquet,et al. Generalized contrasts for multichannel blind deconvolution of linear systems , 1997, IEEE Signal Processing Letters.
[2] Driss Aboutajdine,et al. Source separation contrasts using a reference signal , 2004, IEEE Signal Processing Letters.
[3] Philippe Loubaton,et al. Separation of a class of convolutive mixtures: a contrast function approach , 2001, Signal Process..
[4] Hicham Ghennioui,et al. A Nonunitary Joint Block Diagonalization Algorithm for Blind Separation of Convolutive Mixtures of Sources , 2007, IEEE Signal Processing Letters.
[5] Pierre Comon,et al. Blind Separation of Independent Sources from Convolutive Mixtures , 2003, IEICE Trans. Fundam. Electron. Commun. Comput. Sci..
[6] Eric Moreau,et al. Cubic higher-order criterion and algorithm for blind extraction of a source signal , 2009, 2009 IEEE International Conference on Acoustics, Speech and Signal Processing.
[7] A. Gorokhov,et al. Subspace-based techniques for blind separation of convolutive mixtures with temporally correlated sources , 1997 .
[8] Dieter Boss,et al. Generalized eigenvector algorithm for blind equalization , 1997, Signal Process..
[9] Mitsuru Kawamoto,et al. Eigenvector Algorithms Incorporated With Reference Systems for Solving Blind Deconvolution of MIMO-IIR Linear Systems , 2007, IEEE Signal Processing Letters.
[10] Nathalie Delfosse,et al. Adaptive blind separation of independent sources: A deflation approach , 1995, Signal Process..
[11] Yujiro Inouye,et al. Iterative algorithms based on multistage criteria for multichannel blind deconvolution , 1999, IEEE Trans. Signal Process..
[12] Eric Moreau,et al. A generalization of joint-diagonalization criteria for source separation , 2001, IEEE Trans. Signal Process..
[13] Joos Vandewalle,et al. A Multilinear Singular Value Decomposition , 2000, SIAM J. Matrix Anal. Appl..
[14] Jitendra K. Tugnait,et al. Identification and deconvolution of multichannel linear non-Gaussian processes using higher order statistics and inverse filter criteria , 1997, IEEE Trans. Signal Process..
[15] 電子情報通信学会. IEICE transactions on fundamentals of electronics, communications and computer sciences , 1992 .
[16] P. Loubaton,et al. Blind deconvolution of multivariate signals: A deflation approach , 1993, Proceedings of ICC '93 - IEEE International Conference on Communications.
[17] L. Lathauwer,et al. On the Best Rank-1 and Rank-( , 2004 .
[18] Jean-Christophe Pesquet,et al. Quadratic Higher Order Criteria for Iterative Blind Separation of a MIMO Convolutive Mixture of Sources , 2007, IEEE Transactions on Signal Processing.
[19] P. Comon,et al. Higher-order power method - application in independent component analysis , 1995 .
[20] P. Comon,et al. Contrasts for multichannel blind deconvolution , 1996, IEEE Signal Processing Letters.
[21] Athina P. Petropulu,et al. A family of frequency- and time-domain contrasts for blind separation of convolutive mixtures of temporally dependent signals , 2005, IEEE Transactions on Signal Processing.
[22] Joos Vandewalle,et al. On the Best Rank-1 and Rank-(R1 , R2, ... , RN) Approximation of Higher-Order Tensors , 2000, SIAM J. Matrix Anal. Appl..