Multirate sampled‐data stabilization for a class of low‐order lower‐triangular nonlinear systems |
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Authors: | Jinping Jia Weisheng Chen Hao Dai |
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Affiliation: | 1. School of Mathematics and Statistics, Xidian University, Xi'an 710071, China;2. School of Aerospace Science and Technology, Xidian University, Xi'an 710071, China |
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Abstract: | This paper investigates the problem of sampled‐data controller design for a class of lower‐triangular systems in the p‐normal form (0<p<1). A multirate digital feedback control scheme is proposed to achieve the global strong stabilization of the sampled‐data closed‐loop system under some assumptions. In the design of the controller, the input‐Lyapunov matching strategy and multirate control approach are combined to obtain better stabilizing performance. Unlike the design method based on the approximate discrete‐time model, our controller is obtained from the exact discrete‐time equivalent model, which does not need to be computed completely. The approximate multirate digital controllers are proved to be effective in the practical implementation. It is shown that, compared with the emulated control scheme, our controller may provide faster decrease of Lyapunov function for each subsystem. This will lead to allow large sampling periods. An illustrative example is provided to verify the effectiveness of the proposed control scheme. |
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Keywords: | digital feedback control global strong stability input‐Lyapunov matching low‐order nonlinear systems multirate control |
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