Abstract
This paper deals with a new filtering problem for linear uncertain discrete-time stochastic systems with randomly varying sensor delay. The system measurements are subject to randomly varying sensor delays, which often occur in information transmissions through networks. The problem addressed is the design of a linear filter such that, for all admissible parameter uncertainties and all probabilistic sensor delays, the error state of the filtering process is mean square bounded, and the steady-state variance of the estimation error for each state is not more than the individual prescribed upper bound. We show that the filtering problem under consideration can effectively be solved if there are positive definite solutions to a couple of algebraic Riccati-like inequalities or linear matrix inequalities. We also characterize the set of desired robust filters in terms of some free parameters.
| Original language | English |
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| Title of host publication | 2003 European Control Conference (ECC) |
| Publisher | IEEE |
| Pages | 3204-3209 |
| ISBN (Print) | 9783952417379 |
| DOIs | |
| Publication status | Published - Sept 2003 |
| Event | 2003 European Control Conference (ECC 2003) - Cambridge, United Kingdom Duration: 1 Sept 2003 → 4 Sept 2003 |
Conference
| Conference | 2003 European Control Conference (ECC 2003) |
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| Place | United Kingdom |
| City | Cambridge |
| Period | 1/09/03 → 4/09/03 |
Research Keywords
- Algebraic matrix inequality
- Kalman filtering
- Parameter uncertainty
- Random sensor delay
- Robust filtering