A deterministic filter for non-Gaussian Bayesian estimation Applications to dynamical system estimation with noisy measurements

Oliver Pajonk*, Bojana V. Rosi, Alexander Litvinenko, Hermann G. Matthies

*Corresponding author for this work

Research output: Contribution to journalArticlepeer-review

48 Scopus citations

Abstract

We present a fully deterministic method to compute sequential updates for stochastic state estimates of dynamic models from noisy measurements. It does not need any assumptions about the type of distribution for either data or measurementin particular it does not have to assume any of them as Gaussian. Here the implementation is based on a polynomial chaos expansion (PCE) of the stochastic variables of the modelhowever, any other orthogonal basis would do. We use a minimum variance estimator that combines an a priori state estimate and noisy measurements in a Bayesian way. For computational purposes, the update equation is projected onto a finite-dimensional PCE-subspace. The resulting Kalman-type update formula for the PCE coefficients can be efficiently computed solely within the PCE. As it does not rely on sampling, the method is deterministic, robust, and fast. In this paper we discuss the theory and practical implementation of the method. The original Kalman filter is shown to be a low-order special case. In a first experiment, we perform a bi-modal identification using noisy measurements. Additionally, we provide numerical experiments by applying it to the well known Lorenz-84 model and compare it to a related method, the ensemble Kalman filter.

Original languageEnglish (US)
Pages (from-to)775-788
Number of pages14
JournalPhysica D: Nonlinear Phenomena
Volume241
Issue number7
DOIs
StatePublished - Apr 1 2012
Externally publishedYes

Keywords

  • Bayesian estimation
  • Inverse problem
  • Kalman filter
  • Polynomial chaos expansion
  • White noise analysis

ASJC Scopus subject areas

  • Statistical and Nonlinear Physics
  • Mathematical Physics
  • Condensed Matter Physics
  • Applied Mathematics

Fingerprint

Dive into the research topics of 'A deterministic filter for non-Gaussian Bayesian estimation Applications to dynamical system estimation with noisy measurements'. Together they form a unique fingerprint.

Cite this