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Auteurs principaux: Tsuruhara, Satoshi, Ito, Kazuhisa
Format: Preprint
Publié: 2025
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Accès en ligne:https://arxiv.org/abs/2504.19518
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author Tsuruhara, Satoshi
Ito, Kazuhisa
author_facet Tsuruhara, Satoshi
Ito, Kazuhisa
contents In recent years, adaptive identification methods that can achieve the true value convergence of parameters without requiring persistent excitation (PE) have been widely studied, and concurrent learning has been intensively studied. However, the parameter convergence rate is limited for the gradient-based method owing to small parameter update gain, and even the introduction of forgetting factors does not work sufficiently. To address this problem, this study proposes a novel discrete-time recursive least squares method under finite excitation (FE) conditions using two forgetting factors (inner and outer) and an augmented regressor matrix comprising a sum of regressor vectors. The proposed method ensures the PE condition of the augmented regressor matrix under FE conditions of the regressor vector and allows the properly design of the forgetting factor without estimator windup and/or destabilization of the system. Numerical simulations demonstrate its effectiveness by comparing it with several conventional methods.
format Preprint
id arxiv_https___arxiv_org_abs_2504_19518
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Discrete-time Two-Layered Forgetting RLS Identification under Finite Excitation
Tsuruhara, Satoshi
Ito, Kazuhisa
Systems and Control
In recent years, adaptive identification methods that can achieve the true value convergence of parameters without requiring persistent excitation (PE) have been widely studied, and concurrent learning has been intensively studied. However, the parameter convergence rate is limited for the gradient-based method owing to small parameter update gain, and even the introduction of forgetting factors does not work sufficiently. To address this problem, this study proposes a novel discrete-time recursive least squares method under finite excitation (FE) conditions using two forgetting factors (inner and outer) and an augmented regressor matrix comprising a sum of regressor vectors. The proposed method ensures the PE condition of the augmented regressor matrix under FE conditions of the regressor vector and allows the properly design of the forgetting factor without estimator windup and/or destabilization of the system. Numerical simulations demonstrate its effectiveness by comparing it with several conventional methods.
title Discrete-time Two-Layered Forgetting RLS Identification under Finite Excitation
topic Systems and Control
url https://arxiv.org/abs/2504.19518