Variations around gradient like algorithms for joint diagonalization of hermitian matrices
暂无分享,去创建一个
[1] Serge Dégerine,et al. A Comparative Study of Approximate Joint Diagonalization Algorithms for Blind Source Separation in Presence of Additive Noise , 2007, IEEE Transactions on Signal Processing.
[2] Pierre Comon,et al. Independent component analysis, A new concept? , 1994, Signal Process..
[3] Eric Moreau,et al. A generalization of joint-diagonalization criteria for source separation , 2001, IEEE Trans. Signal Process..
[4] J. Cardoso,et al. Blind beamforming for non-gaussian signals , 1993 .
[5] Arie Yeredor,et al. Approximate Joint Diagonalization Using a Natural Gradient Approach , 2004, ICA.
[6] Eric Moreau,et al. High order contrasts for self-adaptive source separation criteria for complex source separation , 1996 .
[7] Arie Yeredor,et al. Non-orthogonal joint diagonalization in the least-squares sense with application in blind source separation , 2002, IEEE Trans. Signal Process..
[8] Eric Moreau,et al. A one stage self-adaptive algorithm for source separation , 1994, Proceedings of ICASSP '94. IEEE International Conference on Acoustics, Speech and Signal Processing.
[9] Eric Moulines,et al. A blind source separation technique using second-order statistics , 1997, IEEE Trans. Signal Process..
[10] Heinz Mathis,et al. Joint diagonalization of correlation matrices by using gradient methods with application to blind signal separation , 2002, Sensor Array and Multichannel Signal Processing Workshop Proceedings, 2002.
[11] X. Q. Yang,et al. A New Gradient Method with an Optimal Stepsize Property , 2006, Comput. Optim. Appl..
[12] Dinh Tuan Pham,et al. Joint Approximate Diagonalization of Positive Definite Hermitian Matrices , 2000, SIAM J. Matrix Anal. Appl..
[13] Andreas Ziehe,et al. A Fast Algorithm for Joint Diagonalization with Non-orthogonal Transformations and its Application to Blind Source Separation , 2004, J. Mach. Learn. Res..
[14] Tülay Adali,et al. A relative gradient algorithm for joint decompositions of complex matrices , 2010, 2010 18th European Signal Processing Conference.
[15] M. Joho,et al. Joint diagonalization of correlation matrices by using Newton methods with application to blind signal separation , 2002, Sensor Array and Multichannel Signal Processing Workshop Proceedings, 2002.
[16] Rasmus Bro,et al. MULTI-WAY ANALYSIS IN THE FOOD INDUSTRY Models, Algorithms & Applications , 1998 .