This paper studies the stability of Kalman filtering over a network subject to random packet losses, which are modeled by a time-homogeneous ergodic Markov process. For second-order systems, necessary and sufficient conditions for stability of the mean estimation error covariance matrices are derived by taking into account the system structure. While for certain classes of higher-order systems, necessary and sufficient conditions are also provided to ensure stability of the mean estimation error covariance matrices. All stability criteria are expressed by simple inequalities in terms of the largest eigenvalue of the open loop matrix and transition probabilities of the Markov process. Their implications and relationships with related results...
We consider the problem of state estimation of a discrete time process over a packet dropping networ...
In this paper, we consider a discrete time state estimation problem over a packet-based network. In ...
Kalman filter is known as the optimal linear mean-squared error estimator. It has been a hot topic i...
We consider Kalman filtering in a network with packet losses, and use a two state Markov chain to de...
We consider Kalman filtering in a network with packet losses, and use a two state Markov chain to de...
We consider Kalman filtering in a network with packet losses, and use a two state Markov chain to de...
This paper investigates the stability of Kalman filtering over Gilbert-Elliott channels where the ra...
We address the peak covariance stability of time-varying Kalman filter with possible packet losses i...
This paper studies the remote Kalman filtering problem for a distributed system setting with multipl...
This paper addresses the stability of a Kalman filter when measurements are intermittently available...
Abstract — We study the Kalman filtering problem when part or all of the observation measurements ar...
Stochastic stability for centralized Kalman filtering over a wireless sensor network with correlated...
In this paper, we investigate probabilistic stability of Kalman filtering over fading channels model...
Networked control systems have attracted recurring research interests from the control community due...
In this paper, we consider a discrete time state estimation problem over a packet-based network. In ...
We consider the problem of state estimation of a discrete time process over a packet dropping networ...
In this paper, we consider a discrete time state estimation problem over a packet-based network. In ...
Kalman filter is known as the optimal linear mean-squared error estimator. It has been a hot topic i...
We consider Kalman filtering in a network with packet losses, and use a two state Markov chain to de...
We consider Kalman filtering in a network with packet losses, and use a two state Markov chain to de...
We consider Kalman filtering in a network with packet losses, and use a two state Markov chain to de...
This paper investigates the stability of Kalman filtering over Gilbert-Elliott channels where the ra...
We address the peak covariance stability of time-varying Kalman filter with possible packet losses i...
This paper studies the remote Kalman filtering problem for a distributed system setting with multipl...
This paper addresses the stability of a Kalman filter when measurements are intermittently available...
Abstract — We study the Kalman filtering problem when part or all of the observation measurements ar...
Stochastic stability for centralized Kalman filtering over a wireless sensor network with correlated...
In this paper, we investigate probabilistic stability of Kalman filtering over fading channels model...
Networked control systems have attracted recurring research interests from the control community due...
In this paper, we consider a discrete time state estimation problem over a packet-based network. In ...
We consider the problem of state estimation of a discrete time process over a packet dropping networ...
In this paper, we consider a discrete time state estimation problem over a packet-based network. In ...
Kalman filter is known as the optimal linear mean-squared error estimator. It has been a hot topic i...