1992
DOI: 10.1109/72.165588
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Gaussian networks for direct adaptive control

Abstract: A direct adaptive tracking control architecture is proposed and evaluated for a class of continuous-time nonlinear dynamic systems for which an explicit linear parameterization of the uncertainty in the dynamics is either unknown or impossible. The architecture uses a network of Gaussian radial basis functions to adaptively compensate for the plant nonlinearities. Under mild assumptions about the degree of smoothness exhibit by the nonlinear functions, the algorithm is proven to be globally stable, with tracki… Show more

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Cited by 1,783 publications
(751 citation statements)
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References 36 publications
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“…we know all the correct basis functions, D will be zero. If the structure of f is unknown, we can use a linearly parametrized function approximator such as locally linear models (Choi & Farrell;Nakanishi et al, 2002Nakanishi et al, , 2004Schaal & Atkeson, 1998) or RBF neural networks (Sanner & Slotine, 1992). In this paper, we assume a perfect approximation where D ¼ 0; the case where D -0 can be treated as in Nakanishi et al (2002Nakanishi et al ( , 2004 by introducing an adaptation deadzone for parameter update.…”
Section: Plant Dynamics and Function Approximationmentioning
confidence: 99%
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“…we know all the correct basis functions, D will be zero. If the structure of f is unknown, we can use a linearly parametrized function approximator such as locally linear models (Choi & Farrell;Nakanishi et al, 2002Nakanishi et al, , 2004Schaal & Atkeson, 1998) or RBF neural networks (Sanner & Slotine, 1992). In this paper, we assume a perfect approximation where D ¼ 0; the case where D -0 can be treated as in Nakanishi et al (2002Nakanishi et al ( , 2004 by introducing an adaptation deadzone for parameter update.…”
Section: Plant Dynamics and Function Approximationmentioning
confidence: 99%
“…In order to facilitate a coherent development of our research results, in this section we review a general formulation of nonlinear adaptive control (Choi & Farrell, 2000;Sanner & Slotine, 1992;Slotine & Li, 1991) with the adaptive feedback controller as depicted in Fig. 2.…”
Section: Nonlinear Adaptive Controlmentioning
confidence: 99%
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“…For the approximation of a continuous function h(Z) : R r → R, the following Radial Function Basis (RBF) Neural Networks (NN) are used [26]:…”
Section: Preliminarymentioning
confidence: 99%