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Uniform exponential stability approximations of semi-discretization schemes for two hybrid systems
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  • Fu Zheng,
  • Lu Zhang,
  • Sizhe Wang,
  • Zhongjie Han
Fu Zheng
Hainan University

Corresponding Author:[email protected]

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Lu Zhang
Bohai University
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Sizhe Wang
Tianjin University
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Zhongjie Han
Tianjin University
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Abstract

The uniform exponential stabilities (UESs) of two hybrid control systems comprised of a wave equation and a second-order ordinary differential equation are investigated in this study. Linear feedback law and local viscosity are considered, as are nonlinear feedback law and internal anti-damping. The hybrid system is first reduced to a first order port-Hamiltonian system with dynamical boundary conditions, and the resulting system is discretized using the average central-difference scheme. Second, the UES of the discrete system is obtained without prior knowledge of the exponential stability of the continuous system. The frequency domain characterization of UES for a family of contractive semigroups and the discrete multiplier approach are used to validate the main conclusions. Finally, the Trotter-Kato Theorem is used to perform a convergence study on the numerical approximation approach. Most notably, the exponential stability of the continuous system is derived by the convergence of energy and UES, which is a novel approach to studying the exponential stability of some complex systems. Numerical simulation is used to validate the effectiveness of the numerical approximating strategy.
Submitted to Mathematical Methods in the Applied Sciences
31 Mar 20241st Revision Received
29 Apr 2024Submission Checks Completed
29 Apr 2024Assigned to Editor
29 Apr 2024Review(s) Completed, Editorial Evaluation Pending
27 Aug 2024Editorial Decision: Accept