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How to get a conservative well-posed linear system out of thin air. Part I. Well-posedness and energy balance

Published online by Cambridge University Press:  15 September 2003

George Weiss
Affiliation:
Department of Electrical and Electronic Engineering, Imperial College London, Exhibition Road, London SW7 2BT, UK; G.Weiss@imperial.ac.uk.
Marius Tucsnak
Affiliation:
Department of Mathematics, University of Nancy I, BP. 239, 54506 Vandœuvre-les-Nancy, France; Marius.Tucsnak@iecn.u-nancy.fr.
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Abstract

Let A0 be a possibly unbounded positive operator on the Hilbert space H, which is boundedly invertible. Let C0 be a bounded operator from ${\cal D}\Big(A_0^{\frac{1}{2}}\Big)$ to another Hilbert space U. We prove that the system of equations $$\ddot z(t)+A_0 z(t) + {\frac{1}{2}}C_0^*C_0\dot z(t) =C_0^*u(t) $$$$y(t) =-C_0 \dot z(t)+u(t),$$ determines a well-posed linear system with input u and output y. The state of this system is $$ x(t) = \left[\begin{matrix}\, z(t) \\ \dot z(t)\end{matrix}\right] \in {\cal D}\left(A_0^{\frac{1}{2}}\right)\times H = X , $$ where X is the state space. Moreover, we have the energy identity $$ \|x(t)\|^2_X-\|x(0)\|_X^2 = \int_0^T\| u(t)\|^2_U {\rm d}t - \int_0^T \|y(t)\|_U^2 {\rm d}t. $$ We show that the system described above is isomorphic to its dual, so that a similar energy identity holds also for the dual system and hence, the system is conservative. We derive various other properties of such systems and we give a relevant example: a wave equation on a bounded n-dimensional domain with boundary control and boundary observation on part of the boundary.

Type
Research Article
Copyright
© EDP Sciences, SMAI, 2003

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