Litcius/Paper detail

Overbounding the effect of uncertain Gauss‐Markov noise in Kalman filtering

Steven Langel, Omar García Crespillo, Mathieu Joerger

2021NAVIGATION Journal of the Institute of Navigation21 citationsDOIOpen Access PDF

Abstract

<h3>Abstract</h3> Prior work established a model for uncertain Gauss-Markov (GM) noise that is guaranteed to produce a Kalman filter (KF) covariance matrix that overbounds the estimate error distribution. The derivation was conducted for the continuous-time KF when the GM time constants are only known to reside within specified intervals. This paper first provides a more accessible derivation of the continuous-time result and determines the minimum initial variance of the model. This leads to a new, non-stationary model for uncertain GM noise that we prove yields an overbounding estimate error covariance matrix for both sampled-data and discrete-time systems. The new model is evaluated using covariance analysis for a one-dimensional estimation problem and for an example application in Advanced Receiver Autonomous Integrity Monitoring (ARAIM).

Topics & Concepts

Kalman filterCovarianceNoise (video)Covariance matrixControl theory (sociology)MathematicsWhite noiseMarkov chainComputer scienceGaussFast Kalman filterApplied mathematicsExtended Kalman filterAlgorithmStatisticsArtificial intelligenceControl (management)PhysicsImage (mathematics)Quantum mechanicsTarget Tracking and Data Fusion in Sensor NetworksFault Detection and Control SystemsScientific Measurement and Uncertainty Evaluation