Equivariant Systems Theory and Observer Design for Second Order Kinematic Systems on Matrix Lie Groups

Yonhon Ng, Pieter Van Goor, Tarek Hamel, Robert Mahony

    Research output: Chapter in Book/Report/Conference proceedingConference contributionpeer-review

    7 Citations (Scopus)

    Abstract

    This paper presents the equivariant systems theory and observer design for second order kinematic systems on matrix Lie groups. The state of a second order kinematic system on a matrix Lie group is naturally posed on the tangent bundle of the group with the inputs lying in the tangent of the tangent bundle known as the double tangent bundle. We provide a simple parameterization of both the tangent bundle state space and the input space (the fiber space of the double tangent bundle) and then introduce a semi-direct product group and group actions onto both the state and input spaces. We show that with the proposed group actions the second order kinematics are equivariant. An equivariant lift of the kinematics onto the symmetry group is defined and used to design a nonlinear observer on the lifted state space using nonlinear constructive design techniques. A simple hovercraft simulation verifies the performance of our observer.

    Original languageEnglish
    Title of host publication2020 59th IEEE Conference on Decision and Control, CDC 2020
    PublisherInstitute of Electrical and Electronics Engineers Inc.
    Pages4194-4199
    Number of pages6
    ISBN (Electronic)9781728174471
    DOIs
    Publication statusPublished - 14 Dec 2020
    Event59th IEEE Conference on Decision and Control, CDC 2020 - Virtual, Jeju Island, Korea, Republic of
    Duration: 14 Dec 202018 Dec 2020

    Publication series

    NameProceedings of the IEEE Conference on Decision and Control
    Volume2020-December
    ISSN (Print)0743-1546
    ISSN (Electronic)2576-2370

    Conference

    Conference59th IEEE Conference on Decision and Control, CDC 2020
    Country/TerritoryKorea, Republic of
    CityVirtual, Jeju Island
    Period14/12/2018/12/20

    Fingerprint

    Dive into the research topics of 'Equivariant Systems Theory and Observer Design for Second Order Kinematic Systems on Matrix Lie Groups'. Together they form a unique fingerprint.

    Cite this