標題: Generalization of all stabilizing compensators for finite-dimensional linear systems
作者: Huang, Yuan-Yong
Lee, An-Chen
機械工程學系
Department of Mechanical Engineering
關鍵字: Youla-Kucera parameterization;Diophantine equation;Diophantine identity;all stabilizing compensators
公開日期: 1-Nov-2007
摘要: For finite-dimensional linear systems, the Youla-Kucera parameterization (YKP) with a Q parameter over RH infinity is assumed to satisfy the Diophantine identity. However, the stability is guaranteed if the Diophantine equation is the "U(RH infinity)" equality, but not if it is the "identity" equality. However, Vidyasagar's structure with an H parameter over U(RH infinity) is an observer-controller configuration that satisfies the Diophantine equation. This study discusses the deficiency of the Diophantine identity; expands the YKP using an H parameter over U(RH infinity), and expands the Vidyasagar's structure using a Q(v) parameter over RH infinity so that both of the expanded parameterizations satisfy the Diophantine equation and are equivalent for all stabilizing compensators. Moreover, an equation that relates to Q, Q(v), and H will be introduced to establish relationships among the YKP, Vidyasagar's structure and both expanded parameterizations. (c) 2007 The Franklin Institute. Published by Elsevier Ltd. All rights reserved.
URI: http://dx.doi.org/10.1016/j.jfranklin.2007.05.005
http://hdl.handle.net/11536/10207
ISSN: 0016-0032
DOI: 10.1016/j.jfranklin.2007.05.005
期刊: JOURNAL OF THE FRANKLIN INSTITUTE-ENGINEERING AND APPLIED MATHEMATICS
Volume: 344
Issue: 8
起始頁: 1075
結束頁: 1090
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