A Stieltjes transform approach for analyzing the RLS adaptive Filter
- Creators
- Vakili, Ali
- Hassibi, Babak
Abstract
Although the RLS filter is well-known and various algorithms have been developed for its implementation, analyzing its performance when the regressors are random, as is often the case, has proven to be a formidable task. The reason is that the Riccati recursion, which propagates the error covariance matrix, becomes a random recursion. The existing results are approximations based on assumptions that are often not very realistic. In this paper we use ideas from the theory of large random matrices to find the asymptotic (in time) eigendistribution of the error covariance matrix of the RLS filter. Under the assumption of a large dimensional state vector (in most cases n = 10-20 is large enough to get quite accurate predictions) we find the asymptotic eigendistribution of the error covariance for temporally white regressors, shift structured regressors, and for the RLS filter with intermittent observations.
Additional Information
© 2008 IEEE. Issue Date: 23-26 Sept. 2008; Date of Current Version : 04 March 2009. This work was supported in part by the National Science Foundation through grant CCF-0729203, by the David and Lucille Packard Foundation, by the Office of Naval Research through a MURI under contract no. N00014-08-1-0747, and by Caltech's Lee Center for Advanced Networking.Attached Files
Published - Vakili2008p80642008_46Th_Annual_Allerton_Conference_On_Communication_Control_And_Computing_Vols_1-3.pdf
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Additional details
- Eprint ID
- 19178
- Resolver ID
- CaltechAUTHORS:20100723-095254413
- NSF
- CCF-0729203
- David and Lucile Packard Foundation
- Office of Naval Research (ONR)
- N00014-08-1-0747
- Caltech Lee Center for Advanced Networking
- Created
-
2010-07-27Created from EPrint's datestamp field
- Updated
-
2021-11-08Created from EPrint's last_modified field
- Other Numbering System Name
- INSPEC Accession Number
- Other Numbering System Identifier
- 10501090