Consensus+Innovations Distributed Kalman Filter with Optimized Gains

May 19, 2016 Β· Declared Dead Β· πŸ› IEEE Transactions on Signal Processing

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Authors Subhro Das, JosΓ© M. F. Moura arXiv ID 1605.06096 Category cs.IT: Information Theory Cross-listed eess.SY, math.OC Citations 141 Venue IEEE Transactions on Signal Processing Last Checked 4 months ago
Abstract
In this paper, we address the distributed filtering and prediction of time-varying random fields represented by linear time-invariant (LTI) dynamical systems. The field is observed by a sparsely connected network of agents/sensors collaborating among themselves. We develop a Kalman filter type consensus+innovations distributed linear estimator of the dynamic field termed as Consensus+Innovations Kalman Filter. We analyze the convergence properties of this distributed estimator. We prove that the mean-squared error of the estimator asymptotically converges if the degree of instability of the field dynamics is within a pre-specified threshold defined as tracking capacity of the estimator. The tracking capacity is a function of the local observation models and the agent communication network. We design the optimal consensus and innovation gain matrices yielding distributed estimates with minimized mean-squared error. Through numerical evaluations, we show that, the distributed estimator with optimal gains converges faster and with approximately 3dB better mean-squared error performance than previous distributed estimators.
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