Title :
Adaptive linear filtering using interior point optimization techniques
Author :
Afkhamie, Kaywan H. ; Luo, Zhi-Quan Tom ; Wong, Kon Max
Author_Institution :
Commun. Res. Lab., McMaster Univ., Hamilton, Ont., Canada
fDate :
6/1/2000 12:00:00 AM
Abstract :
We propose a novel approach for the linear adaptive filtering problem using techniques from interior point optimization. The main idea is to formulate a feasibility problem at each iteration and obtain as an estimate a filter near the center of the feasible region. It is shown, under some mild conditions, that this algorithm generates a sequence of filters converging to the optimum linear filter at the rate O(1/n), where n is the number of data samples. Furthermore, we show that the algorithm can be made recursive with a per-sample complexity of O(M2.3), where M is the filter length. The potential of the algorithm for practical applications is demonstrated via numerical simulations where the new algorithm is shown to have superior transient behavior and improved robustness to the source signal statistics when compared to the recursive least squares (RLS) method
Keywords :
adaptive filters; adaptive signal processing; circuit optimisation; computational complexity; convergence of numerical methods; filtering theory; least squares approximations; statistical analysis; transient analysis; adaptive linear filtering; data samples; feasibility problem; filter length; interior point optimization; numerical simulations; optimum linear filter; per-sample complexity; recursive algorithm; recursive least squares method; source signal statistics; transient behavior; Adaptive filters; Additive noise; Maximum likelihood detection; Nonlinear filters; Numerical simulation; Parameter estimation; Resonance light scattering; Robustness; Signal processing algorithms; Vectors;
Journal_Title :
Signal Processing, IEEE Transactions on
