Abstract
The class of LMS algorithms employing a general error nonlinearity is considered. The calculus of variations is employed to obtain the optimum error nonlinearity for an independent and identically distributed input. The nonlinearity represents a unifying view of error nonlinearities in LMS adaptation. In particular, it subsumes two recently developed optimum nonlinearities for arbitrary and Gaussian inputs. Moreover, several more familiar algorithms such as the LMS algorithm, the least-mean fourth (LMF) algorithm and its family, and the mixed norm algorithm employ (non)linearities that are actually approximations of the optimum nonlinearity.
Original language | English |
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Article number | 7075229 |
Journal | European Signal Processing Conference |
Volume | 2015-March |
Issue number | March |
State | Published - 31 Mar 2000 |
Bibliographical note
Publisher Copyright:© 2000 EUSIPCO.
ASJC Scopus subject areas
- Signal Processing
- Electrical and Electronic Engineering