On the robustness of FIR channel identification from fractionally spaced received signal second-order statistics

“…See Appendix A for the proof of Property 1. Property 1 and C1) imply that can be zero phase, which further leads to the following property about the system given by (13). Property 2: Assume that is zero-phase and that ) the number of zeros of on the unit circle is finite.…”

“…With our experience, assumption generally holds true in practical applications and is never an issue in the design of BSI algorithms. Again, one can see, from (5) and (13), that the left-hand side of (11) is a highly nonlinear function of , implying that a closed-form solution of (11) for is almost formidable under constraint C1). Next, let us present an iterative FFT-based nonparametric algorithm for estimating under the constraint C1).…”

“…T2) Update by . Update , where zero phase (20) and then obtain by (16) and (18) where is the -point FFT of obtained by (13). Normalize such that .…”

“…However, some of these methods require the knowledge of the system order, and their performance is sensitive to the system order mismatch [3]. Furthermore, a common identifiability condition referred to as the channel disparity condition, which is required by these subspace methods, is that the subchannels must be coprime (i.e., the subchannels have no common zeros), and these methods tend to fail when this condition is nearly violated [12], [13]. Recently, the NS method [7] that was modified by Ali et al [14] was shown to be robust in the presence of common subchannel zeros and the system order overestimation errors by virtue of exploiting the transmitter redundancy through the use of a trailing zero precoder.…”

Blind Identification of SIMO Systems and Simultaneous Estimation of Multiple Time Delays From HOS-Based Inverse Filter Criteria

“…See Appendix A for the proof of Property 1. Property 1 and C1) imply that can be zero phase, which further leads to the following property about the system given by (13). Property 2: Assume that is zero-phase and that ) the number of zeros of on the unit circle is finite.…”

“…With our experience, assumption generally holds true in practical applications and is never an issue in the design of BSI algorithms. Again, one can see, from (5) and (13), that the left-hand side of (11) is a highly nonlinear function of , implying that a closed-form solution of (11) for is almost formidable under constraint C1). Next, let us present an iterative FFT-based nonparametric algorithm for estimating under the constraint C1).…”

“…T2) Update by . Update , where zero phase (20) and then obtain by (16) and (18) where is the -point FFT of obtained by (13). Normalize such that .…”

“…However, some of these methods require the knowledge of the system order, and their performance is sensitive to the system order mismatch [3]. Furthermore, a common identifiability condition referred to as the channel disparity condition, which is required by these subspace methods, is that the subchannels must be coprime (i.e., the subchannels have no common zeros), and these methods tend to fail when this condition is nearly violated [12], [13]. Recently, the NS method [7] that was modified by Ali et al [14] was shown to be robust in the presence of common subchannel zeros and the system order overestimation errors by virtue of exploiting the transmitter redundancy through the use of a trailing zero precoder.…”

Blind Identification of SIMO Systems and Simultaneous Estimation of Multiple Time Delays From HOS-Based Inverse Filter Criteria

“…10 However, not all channels can be equalized using the F-spaced setting. 11 There are other problems such as higher power consumption due to oversampling, parameter drift, 7 increased equalizer complexity and estimation of the minimum equalizer order. 12 Furthermore, the performance of F-spaced blind algorithms in fading channels is not well-understood.…”

Soft constraint satisfaction (SCS) blind channel equalization algorithms

MIMO Blind Equalization Algorithms