Cheng-Zhong Xu scite author profile

Cheng-Zhong Xu

3Publications

188Citation Statements Received

84Citation Statements Given

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294

185

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Affiliations

Automation and Process Engineering Laboratory, Claude Bernard University Lyon 1, French Institute for Research in Computer Science and Automation

Publications

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Exponential Stability and Transfer Functions of Processes Governed by Symmetric Hyperbolic Systems

Sallet

2002

ESAIM: COCV

124

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Abstract. In this paper we study the frequency and time domain behaviour of a heat exchanger network system. The system is governed by hyperbolic partial differential equations. Both the control operator and the observation operator are unbounded but admissible. Using the theory of symmetric hyperbolic systems, we prove exponential stability of the underlying semigroup for the heat exchanger network. Applying the recent theory of well-posed infinite-dimensional linear systems, we prove that the system is regular and derive various properties of its transfer functions, which are potentially useful for controller design. Our results remain valid for a wide class of processes governed by symmetric hyperbolic systems.Mathematics Subject Classification. 93D09, 93D25, 80A20, 35L50.

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The Stabilization of a One-Dimensional Wave Equation by Boundary Feedback With Noncollocated Observation

Guo

2007

IEEE Trans. Automat. Contr.

107

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Boundary feedback stabilization of a rotating body-beam system

Laousy

Sallet

1996

IEEE Trans. Automat. Contr.

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Cheng-Zhong Xu

Exponential Stability and Transfer Functions of Processes Governed by Symmetric Hyperbolic Systems

The Stabilization of a One-Dimensional Wave Equation by Boundary Feedback With Noncollocated Observation

Boundary feedback stabilization of a rotating body-beam system

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