• DocumentCode
    2582898
  • Title

    Consensus-based distributed linear filtering

  • Author

    Matei, Ion ; Baras, John S.

  • Author_Institution
    Dept. of Electr. & Comput. Eng., Univ. of Maryland, College Park, MD, USA
  • fYear
    2010
  • fDate
    15-17 Dec. 2010
  • Firstpage
    7009
  • Lastpage
    7014
  • Abstract
    We address the consensus-based distributed linear filtering problem, where a discrete time, linear stochastic process is observed by a network of sensors. We assume that the consensus weights are known and we first provide sufficient conditions under which the stochastic process is detectable, i.e. for a specific choice of consensus weights there exists a set of filtering gains such that the dynamics of the estimation errors (without noise) is asymptotically stable. Next, we provide a distributed, sub-optimal filtering scheme based on minimizing an upper bound on a quadratic filtering cost. In the stationary case, we provide sufficient conditions under which this scheme converges; conditions expressed in terms of the convergence properties of a set of coupled Riccati equations. We continue with presenting a connection between the consensus-based distributed linear filter and the optimal linear filter of a Markovian jump linear system, appropriately defined. More specifically, we show that if the Markovian jump linear system is (mean square) detectable, then the stochastic process is detectable under the consensus-based distributed linear filtering scheme. We also show that the optimal gains of a linear filter for estimating the state of a Markovian jump linear system appropriately defined can be used to approximate the optimal gains of the consensus-based linear filter.
  • Keywords
    Riccati equations; asymptotic stability; convergence; discrete time systems; filtering theory; linear systems; stochastic systems; wireless sensor networks; Markovian jump linear system; Riccati equations; asymptotic stability; consensus weights; consensus-based distributed linear filtering; convergence property; discrete time process; estimation error dynamics; filtering gains; linear stochastic process; quadratic filtering cost; sensor network; stochastic process; sub-optimal filtering scheme; Covariance matrix; Estimation error; Linear matrix inequalities; Linear systems; Noise; Sensors; Stochastic processes;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Decision and Control (CDC), 2010 49th IEEE Conference on
  • Conference_Location
    Atlanta, GA
  • ISSN
    0743-1546
  • Print_ISBN
    978-1-4244-7745-6
  • Type

    conf

  • DOI
    10.1109/CDC.2010.5718072
  • Filename
    5718072