The Probability Density Function of Bearing Obtained From a Cartesian-to-Polar Transformation

The Probability Density Function of Bearing Obtained From a Cartesian-to-Polar Transformation

The problem of tracking a two-dimensional Cartesian state of a target using polar observations is well known. At a close range, a traditional extended Kalman filter (EKF) can fail owing to nonlinearity introduced by the Cartesian-to-polar transformation in the observation prediction step of the filt...

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Bibliographic Details
Main Authors: Ford, K.R (Author), Haug, A.J (Author)
Format: Article
Language:English
Published: Institute of Electrical and Electronics Engineers Inc. 2022
Subjects:
Arctangent
Bearing
Bivariate gaussian distributions
Cartesians
Close range
Extended Kalman filters
Gaussian
Gaussian distribution
Gaussian noise (electronic)
Gaussians
Kalman filter
Mathematical transformations
Non-linear transformations
PDF
Polar transformations
Probability density function
State-variables
Two-dimensional
Online Access:View Fulltext in Publisher
Description
Summary:The problem of tracking a two-dimensional Cartesian state of a target using polar observations is well known. At a close range, a traditional extended Kalman filter (EKF) can fail owing to nonlinearity introduced by the Cartesian-to-polar transformation in the observation prediction step of the filter. This is a byproduct of the nonlinear transformation acting on the state variables, which make up a bivariate Gaussian distribution. The nonlinear transformation in question is the arctangent of Cartesian state variables
ISBN:21693536 (ISSN)
DOI:10.1109/ACCESS.2022.3161974

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