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applications however, the equations describing the state propagation and/or that for the measurement process are non-linear. As | applications however, the equations describing the state propagation and/or that for the measurement process are non-linear. As | ||
long as those non-linearities remain mild in a certain sense, relatives of the Kalman filter suffice to provide suitable estimates | long as those non-linearities remain mild in a certain sense, relatives of the Kalman filter suffice to provide suitable estimates | ||
− | with at least approximate consistency. | + | with at least approximate consistency.<br /> |
The proposed tutorial focusses on a variety of those relatives. It starts by recalling the basic relationships and properties of | The proposed tutorial focusses on a variety of those relatives. It starts by recalling the basic relationships and properties of | ||
the Kalman filter. As a motivation for the later topics, its different optimality properties are shortly discussed as are various | the Kalman filter. As a motivation for the later topics, its different optimality properties are shortly discussed as are various | ||
ways to write in particular its update equation (e. g., the Joseph form and the information form). The latter then leads over to | ways to write in particular its update equation (e. g., the Joseph form and the information form). The latter then leads over to | ||
the aspect of data fusion with convex combination (CC) and covariance intersection (CI) as two prominent approaches. The | the aspect of data fusion with convex combination (CC) and covariance intersection (CI) as two prominent approaches. The | ||
− | interacting multiple model (IMM) is presented as a method to deal with jump-Markovian linear systems. | + | interacting multiple model (IMM) is presented as a method to deal with jump-Markovian linear systems.<br /> |
Starting from those results for linear systems, the generalization to non-linear systems is discussed. The best linear unbiased | Starting from those results for linear systems, the generalization to non-linear systems is discussed. The best linear unbiased | ||
estimator (BLUE) filter is introduced and general-purpose approximations like the extended Kalman filter (EKF), the unscented | estimator (BLUE) filter is introduced and general-purpose approximations like the extended Kalman filter (EKF), the unscented | ||
Kalman filter (UKF), and the Gauss filter (GF) are put in its context, detailed for polar measurements. For that same example, | Kalman filter (UKF), and the Gauss filter (GF) are put in its context, detailed for polar measurements. For that same example, | ||
converted measurement (CM) filters are examined. While being straight-forward to implement, they come with the inherent | converted measurement (CM) filters are examined. While being straight-forward to implement, they come with the inherent | ||
− | problem of generating estimation bias. This problem and proposed solutions are investigated. | + | problem of generating estimation bias. This problem and proposed solutions are investigated.<br /> |
An alternative to converting the measurements to state-(sub-)space is given by a conversion of the states to measurement | An alternative to converting the measurements to state-(sub-)space is given by a conversion of the states to measurement | ||
space. For the example of angular-only measurements, log-spherical coordinates (LSCs) are presented as such a suitable statespace | space. For the example of angular-only measurements, log-spherical coordinates (LSCs) are presented as such a suitable statespace | ||
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Latest revision as of 10:37, 29 June 2016
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