Complex Adaptive ICA Employing the Conjugate Gradient Technique for Signal Separation in Time-Varying Flat Fading Channels

Complex Adaptive ICA Employing the Conjugate Gradient Technique for Signal Separation in Time-Varying Flat Fading Channels

The conjugate gradient method is a prominent technique for solving systems of linear equations and unconstrained optimization problems, including adaptive filtering. Since it is an iterative method, it can be particularly applied to solve sparse systems which are too large to be handled by direct me...

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Bibliographic Details
Published in:Circuits, systems, and signal processing Vol. 29; no. 3; pp. 469 - 480
Main Authors: Mikhael, Wasfy B., Ranganathan, Raghuram, Yang, Thomas
Format: Journal Article
Language:English
Published: Boston SP Birkhäuser Verlag Boston 01-06-2010
Springer Nature B.V
Subjects:
Circuits and Systems
Computational mathematics
Conjugate gradient method
Conjugate gradients
Convergence
Electrical Engineering
Electronics and Microelectronics
Engineering
Fading
Instrumentation
Linear equations
Mathematical analysis
Mathematical models
Optimization
Separation
Signal processing
Signal,Image and Speech Processing
Fading
Adaptive filtering
Conjugate gradient
Kurtosis
Independent component analysis
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Summary:The conjugate gradient method is a prominent technique for solving systems of linear equations and unconstrained optimization problems, including adaptive filtering. Since it is an iterative method, it can be particularly applied to solve sparse systems which are too large to be handled by direct methods. The main advantage of the conjugate gradient method is that it employs orthogonal search directions with optimal steps along each direction to arrive at the solution. As a result, it has a much faster convergence speed than the steepest descent method, which often takes steps in the same direction as earlier steps. Furthermore, it has lower computational complexity than Newton’s iteration approach. This unique tradeoff between convergence speed and computational complexity gives the conjugate gradient method desirable properties for application in numerous mathematical optimization problems. In this paper, the conjugate gradient principle is applied to complex adaptive independent component analysis (ICA) for maximization of the kurtosis function, to achieve separation of complex-valued signals. The proposed technique is called the complex block conjugate independent component analysis (CBC-ICA) algorithm. The CBC-ICA derives independent conjugate gradient search directions for the real and imaginary components of the complex coefficients of the adaptive system employed for signal separation. In addition, along each conjugate direction an optimal update is generated separately for the real and imaginary components using the Taylor series approximation. Simulation results confirm that in dynamic flat fading channel conditions, the CBC-ICA demonstrates excellent convergence speed and accuracy, even for large processing block sizes.
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ISSN:0278-081X
1531-5878
DOI:10.1007/s00034-010-9156-x