Title :
LMS is H∞ optimal
Author :
Hassibi, Babak ; Sayed, Ali H. ; Ilath, Thomaksa
Author_Institution :
Inf. Syst. Lab., Stanford Univ., CA, USA
Abstract :
Shows that the celebrated LMS (least-mean squares) adaptive algorithm is an H∞ optimal filter. In other words, the LMS algorithm, which has long been regarded as an approximate least-mean squares solution, is in fact a minimizer of the H∞ error norm. In particular, the LMS minimizes the energy gain from the disturbances to the predicted errors, while the normalized LMS minimizes the energy gain from the disturbances to the filtered errors. Moreover, since these algorithms are central H∞ filters, they are also risk-sensitive optimal and minimize a certain exponential cost function. The authors discuss various implications of these results, and show how they provide theoretical justification for the widely observed excellent robustness properties of the LMS filter
Keywords :
adaptive filters; filtering and prediction theory; least squares approximations; optimal control; stability; H∞ error norm; H∞ optimal filter; approximate least-mean squares solution; central H∞ filters; energy gain; filtered errors; least mean squares filter; least-mean squares adaptive algorithm; minimizer; predicted errors; robustness properties; Adaptive algorithm; Contracts; Filters; Hydrogen; Information systems; Laboratories; Least squares approximation; Minimax techniques; Recursive estimation; Robustness;
Conference_Titel :
Decision and Control, 1993., Proceedings of the 32nd IEEE Conference on
Conference_Location :
San Antonio, TX
Print_ISBN :
0-7803-1298-8
DOI :
10.1109/CDC.1993.325187
