State observability and observers of linear-time-invariant systems under irregular sampling and sensor limitations

Le Yi Wang, Cheng Zhong Xu, Chanying Li, G. George Yin, Cheng-Zhong Xu

    Research output: Contribution to journalArticlepeer-review

    Abstract

    State observability and observer designs are investigated for linear-time-invariant systems in continuous time when the outputs are measured only at a set of irregular sampling time sequences. The problem is primarily motivated by systems with limited sensor information in which sensor switching generates irregular sampling sequences. State observability may be lost and the traditional observers may fail in general, even if the system has a full-rank observability matrix. It demonstrates that if the original system is observable, the irregularly sampled system will be observable if the sampling density is higher than some critical frequency, independent of the actual time sequences. This result extends Shannon’s sampling theorem for signal reconstruction under periodic sampling to system observability under arbitrary sampling sequences. State observers and recursive algorithms are developed whose convergence properties are derived under potentially dependent measurement noises. Persistent excitation conditions are validated by designing sampling time sequences. By generating suitable switching time sequences, the designed state observers are shown to be convergent in mean square, with probability one, and with exponential convergence rates. Schemes for generating desired sampling sequences are summarized.
    Original languageEnglish
    Pages (from-to)2639-2653
    Number of pages16
    JournalIEEE Transactions on Automatic Control
    Volume56
    Issue number11
    DOIs
    Publication statusPublished - 2011

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