An Efficient Regularized Semi-Blind Estimator

This paper addresses the issue of the optimization of the regularization constant in semi-blind channel estimation techniques, in which the training sequence-based criterion is combined linearly with the blind subspace criterion. In such semi-blind estimation techniques, the optimization of the regularizing constant with respect to the channel estimation error is mandatory, otherwise, the expected improvement in performance could not be achieved. In this context, recent works proposed numerical methods for the setting of the regularization constant. However, these methods are often sub-optimum and involve high computational complexities. In this paper, we propose to optimize with respect to a regularizing matrix instead of a regularizing scalar. We prove that interestingly in this case, a closed-form expression for the optimum regularizing matrix exists, thereby avoiding iterative algorithms as for the conventional techniques. We also prove that the obtained scheme has slightly better performance in terms of mean square error and bit error rate while ensuring lower complexity.

[1]  I. Olkin,et al.  Inequalities: Theory of Majorization and Its Applications , 1980 .

[2]  D.T.M. Slock,et al.  Semi-blind maximum-likelihood multichannel estimation with Gaussian prior for the symbols using soft decisions , 1998, VTC '98. 48th IEEE Vehicular Technology Conference. Pathway to Global Wireless Revolution (Cat. No.98CH36151).

[3]  Philippe Loubaton,et al.  A semi-blind channel estimation technique based on second-order blind method for CDMA systems , 2003, IEEE Trans. Signal Process..

[4]  L. Tong,et al.  Multichannel blind identification: from subspace to maximum likelihood methods , 1998, Proc. IEEE.

[5]  Philippe Loubaton,et al.  A subspace algorithm for certain blind identification problems , 1997, IEEE Trans. Inf. Theory.

[6]  M. Tsatsanis,et al.  Stochastic maximum likelihood methods for semi-blind channel equalization , 1997, Conference Record of the Thirty-First Asilomar Conference on Signals, Systems and Computers (Cat. No.97CB36136).

[7]  G. Stewart,et al.  Matrix Perturbation Theory , 1990 .

[8]  Philippe Loubaton,et al.  Semi-blind second order identification of convolutive channels , 1997, 1997 IEEE International Conference on Acoustics, Speech, and Signal Processing.

[9]  Karim Abed-Meraim,et al.  Semi-Blind Stochastic Maximum Likelihood for Frequency Selective MIMO Channels , 2005, 2005 IEEE 16th International Symposium on Personal, Indoor and Mobile Radio Communications.

[10]  Eric Moulines,et al.  On the performance of semi-blind subspace-based channel estimation , 2000, IEEE Trans. Signal Process..

[11]  M. Tsatsanis,et al.  Stochastic maximum likelihood methods for semi-blind channel estimation , 1998, IEEE Signal Processing Letters.