摘要
This paper focuses on the state estimate for a class of systems with both process noise and measurement noise under binary-valued observations,in which the Gaussian assumption on the predicted density of the state is not required.A recursive projected filter algorithm with time-varying thresholds is constructed to estimate the state under binary-valued observations.The time-varying thresholds are designed as the prediction value of the measurement,which can provide more information about the system state.The convergence property is established with some suitable stability,boundedness and observability conditions.In particular,the estimation error between state and estimate is proved to be asymptotically bounded in the mean-square sense,whose upper bound is related to the variance of process noise.Finally,the theoretical results are demonstrated via numerical examples of first-order and high-order systems.
基金
supported by the National Natural Science Foundation of China under Grant Nos.62025306,62122083,62303452,and T2293773
CAS Project for Young Scientists in Basic Research under Grant No.YSBR-008
China Postdoctoral Science Foundation under Grant No.2022M720159
Guozhi Xu Postdoctoral Research Foundation.
