Time-varying additive perturbations of well-posed linear systems

Jian Hua Chen*, George Weiss

*Corresponding author for this work

Research output: Contribution to journalArticlepeer-review

15 Scopus citations

Abstract

We study a time-varying well-posed system resulting from the additive perturbation of the generator of a time-invariant well-posed system. The associated generator family has the form A+G(t), where G(t) is a bounded operator on the state space and G(·) is strongly continuous. We show that the resulting time-varying system (the perturbed system) is well-posed and investigate its properties. In the particular case when the unperturbed system is scattering passive, we derive an energy balance inequality for the perturbed system. We illustrate this theory using it to formulate the system corresponding to an electrically conducting rigid body moving in vacuo in a bounded domain, with an electromagnetic field (both in the rigid body and in the vacuum) described by Maxwell’s equations.

Original languageEnglish
Pages (from-to)149-185
Number of pages37
JournalMathematics of Control, Signals, and Systems
Volume27
Issue number2
DOIs
StatePublished - 1 Jun 2015

Funding

FundersFunder number
State Education Ministry
Israel Science Foundation701/10
Scientific Research Foundation for Returned Scholars of Ministry of Education

    Keywords

    • Evolution family
    • Lax–Phillips semigroup
    • Maxwell’s equations
    • Moving conductor
    • Scattering passive system
    • Well-posed linear system

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