Open AccessObservability for two-dimensional systems
Author(s) -
L.R. Hunt,
Renjeng Su
Publication year - 1984
Publication title -
mathematical systems theory
Language(s) - English
Resource type - Journals
ISSN - 0025-5661
DOI - 10.1007/bf01744438
Subject(s) - observability , controllability , observable , function (biology) , mathematics , inverse function theorem , inverse , control theory (sociology) , computer science , pure mathematics , physics , artificial intelligence , picard–lindelöf theorem , geometry , control (management) , fixed point theorem , quantum mechanics , evolutionary biology , biology
Sufficient conditions that a two-dimensional system with output is locally observable are presented. Known results depend on time derivatives of the output and the inverse function theorem. In some cases, no information is provided by these theories, and one must study observability by other methods. We dualize the observability problem to the controllability problem, and apply the deep results of Hermes on local controllability to prove a theorem concerning local observability.
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