Optimal control of linear discrete-time systems with quantization effects

Su, Weizhou; Chen, Jie; Fu, Minyue; Qi, Tian; Wu, Yilin

Title: Optimal control of linear discrete-time systems with quantization effects
Creator: Su, Weizhou; Chen, Jie; Fu, Minyue; Qi, Tian; Wu, Yilin
Relation: The 26th Chinese Control and Decision Conference (CCDC 2014). Proceedings of the 26th Chinese Control and Decision Conference ( ) p. 2582-2587
Publisher Link: http://dx.doi.org/10.1109/CCDC.2014.6852609
Publisher: Institute of Electrical and Electronics Engineers (IEEE)
Resource Type: conference paper
Date: 2014
Description: This paper studies optimal control designs for networked linear discrete-time systems with quantization effects and/or fading channel. The quantization errors and/or fading channels are modeled as multiplicative noises. The H₂ optimal control in mean-square sense is formulated. The necessary and sufficient condition to the existence of the mean-square stabilizing solution to a modified algebraic Riccati equation (MARE) is presented. The optimal H₂ control via state feedback for the systems is designed by using the solution to the MARE. It is a nature extension for the result in standard optimal discrete-time H₂ state feedback design. It is shown that this optimal state feedback design problem is eigenvalue problem (EVP) and the optimal design algorithm is developed.
Subject: closed loop systems; noise; Ricatti equations; state feedback
Identifier: http://hdl.handle.net/1959.13/1294348
Identifier: uon:18772
Identifier: ISBN:9781479937066
Language: eng
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