Title :
Line search algorithms for adaptive filtering
Author :
Davila, Carlos E.
Author_Institution :
Dept. of Electr. Eng., Southern Methodist Univ., Dallas, TX, USA
fDate :
7/1/1993 12:00:00 AM
Abstract :
Line search algorithms for adaptive filtering that choose the convergence parameter so that the updated filter vector minimizes the sum of squared errors on a linear manifold are described. A shift invariant property of the sample covariance matrix is exploited to produce an adaptive filter stochastic line search algorithm for exponentially weighted adaptive equalization requiring 3N+5 multiplications and divisions per iteration. This algorithm is found to have better numerical stability than fast transversal filter algorithms for an application requiring steady-state tracking capability similar to that of least-mean square (LMS) algorithms. The algorithm is shown to have faster initial convergence than the LMS algorithm and a well-known variable step size algorithm having similar computational complexity in an adaptive equalization experiment
Keywords :
adaptive filters; computational complexity; convergence of numerical methods; filtering and prediction theory; iterative methods; LMS algorithm; adaptive filtering; computational complexity; convergence parameter; exponentially weighted adaptive equalization; fast transversal filter algorithms; iteration; least-mean square; linear manifold; numerical stability; sample covariance matrix; shift invariant property; steady-state tracking capability; stochastic line search algorithm; variable step size algorithm; Adaptive equalizers; Adaptive filters; Convergence; Covariance matrix; Error correction; Filtering algorithms; Least squares approximation; Nonlinear filters; Stochastic processes; Vectors;
Journal_Title :
Signal Processing, IEEE Transactions on
