LMS-2: Towards an algorithm that is as cheap as LMS and almost as efficient as RLS

Yao, Hengshuai ; Bhatnagar, Shalabh ; Szepesvari, Csaba (2009) LMS-2: Towards an algorithm that is as cheap as LMS and almost as efficient as RLS In: Proceedings of the 48h IEEE Conference on Decision and Control (CDC) held jointly with 2009 28th Chinese Control Conference, 15-18 Dec. 2009, Shanghai, China.

Full text not available from this repository.

Official URL: http://doi.org/10.1109/CDC.2009.5400370

Related URL: http://dx.doi.org/10.1109/CDC.2009.5400370

Abstract

We consider linear prediction problems in a stochastic environment. The least mean square (LMS) algorithm is a well-known, easy to implement and computationally cheap solution to this problem. However, as it is well known, the LMS algorithm, being a stochastic gradient descent rule, may converge slowly. The recursive least squares (RLS) algorithm overcomes this problem, but its computational cost is quadratic in the problem dimension. In this paper we propose a two timescale stochastic approximation algorithm which, as far as its slower timescale is considered, behaves the same way as the RLS algorithm, while it is as cheap as the LMS algorithm. In addition, the algorithm is easy to implement. The algorithm is shown to give estimates that converge to the best possible estimate with probability one. The performance of the algorithm is tested in two examples and it is found that it may indeed offer some performance gain over the LMS algorithm.

Item Type:Conference or Workshop Item (Paper)
Source:Copyright of this article belongs to Institute of Electrical and Electronics Engineers.
ID Code:116703
Deposited On:12 Apr 2021 07:25
Last Modified:12 Apr 2021 07:25

Repository Staff Only: item control page