Title :
On the use of kernel structure for blind equalization
Author :
Gunther, Jacob H. ; Swindlehurst, A. Lee
Author_Institution :
Merasoft Inc., Provo, UT, USA
fDate :
3/1/2000 12:00:00 AM
Abstract :
The mathematical theory of kernel (null space) structure of Hankel and Hankel-like matrices is applied to the problem of blind equalization of cochannel signals. This approach provides a new perspective on the blind equalization problem and gives insights into the identifiability conditions already presented in the literature. An algorithm is presented that tracks the exact null space of the symbol matrix even in the presence of noise. This work exploits the shift structure in the oversampled channel output and the finite alphabet property of the signals. Previously, these two properties were used independently in a two-step (equalize then separate) process. A contribution of the new approach is that is allows simultaneous exploitation of both the shift structure and the finite alphabet property of the signals
Keywords :
Hankel matrices; blind equalisers; cochannel interference; signal sampling; Hankel matrices; Hankel-like matrices; algorithm; cochannel signals; finite alphabet property; identifiability conditions; kernel structure; noise; null space structure; null space tracking; oversampled channel output; recursive blind equalization algorithm; shift structure; symbol matrix; Blind equalizers; Communication channels; Data models; Deconvolution; Intersymbol interference; Jacobian matrices; Kernel; Null space; Signal processing; Signal processing algorithms;
Journal_Title :
Signal Processing, IEEE Transactions on
