Series Expansion Approximations of Brownian Motion for Non-Linear Kalman Filtering of Diffusion Processes

In this paper, we describe a novel application of sigma-point methods to continuous-discrete filtering. The nonlinear continuous-discrete filtering problem is often computationally intractable to solve. Assumed density filtering methods attempt to match statistics of the filtering distribution to so...

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Bibliographic Details
Published in:IEEE transactions on signal processing 2014-03, Vol.62 (6), p.1514-1524
Main Authors: Lyons, Simon M. J., Sarkka, Simo, Storkey, Amos J.
Format: Article
Language:English
Subjects:
Applied sciences
Approximation methods
Brownian motion
Decomposition
Density
Detection, estimation, filtering, equalization, prediction
Differential equations
Exact sciences and technology
Filtering
Filtration
Information, signal and communications theory
Kalman filters
Markov processes
Mathematical model
multidimensional signal processing
Noise
nonlinear filters
Nonlinearity
Signal and communications theory
Signal, noise
Statistics
Stochastic processes
Telecommunications and information theory
Transforms
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Summary:In this paper, we describe a novel application of sigma-point methods to continuous-discrete filtering. The nonlinear continuous-discrete filtering problem is often computationally intractable to solve. Assumed density filtering methods attempt to match statistics of the filtering distribution to some set of more tractable probability distributions. Filters such as these are usually decompose the problem into two sub-problems. The first of these is a prediction step, in which one uses the known dynamics of the signal to predict its state at time tk+1 given observations up to time tk. In the second step, one updates the prediction upon arrival of the observation at time tk+1. The aim of this paper is to describe a novel method that improves the prediction step. We decompose the Brownian motion driving the signal in a generalised Fourier series, which is truncated after a number of terms. This approximation to Brownian motion can be described using a relatively small number of Fourier coefficients, and allows us to compute statistics of the filtering distribution with a single application of a sigma-point method. Assumed density filters that exist in the literature usually rely on discretisation of the signal dynamics followed by iterated application of a sigma point transform (or a limiting case thereof). Iterating the transform in this manner can lead to loss of information about the filtering distribution in highly non-linear settings. We demonstrate that our method is better equipped to cope with such problems.
ISSN:1053-587X
1941-0476
DOI:10.1109/TSP.2014.2303430