Title :
Drift homotopy methods for a non-Gaussian filter
Author :
Kai Kang ; Maroulas, Vasileios
Author_Institution :
Dept. of Math., Univ. of Tennessee, Knoxville, TN, USA
Abstract :
We present a novel approach for improving particle filters suited for a nonlinear and non-Gaussian environment. First, the non-Gaussian densities are approximated by a Gaussian mixture model. Next, we employ an approach based on drift homotopy for stochastic differential equations. Drift homotopy constructs a Markov Chain Monte Carlo step which is appended to the particle filter algorithm. This extra step moves the weighted samples closer to the associated observations while at the same time respecting the stochastic dynamics. The algorithm has been implemented in a non-Gaussian problem of diffusion in a double well potential.
Keywords :
Gaussian processes; Markov processes; Monte Carlo methods; differential equations; particle filtering (numerical methods); Gaussian mixture model; Markov Chain Monte Carlo step; double well potential; drift homotopy method; nonGaussian density approximation; nonGaussian environment; nonGaussian filter; nonlinear environment; particle filter algorithm; stochastic differential equation; stochastic dynamics; Yttrium; Drift homotopy; Gaussian mixture model; Markov Chain Monte Carlo; non-Gaussian stochastic systems; particle filtering; sequential Bayesian estimation; sequential sampling methods; simulated annealing;
Conference_Titel :
Information Fusion (FUSION), 2013 16th International Conference on
Conference_Location :
Istanbul
Print_ISBN :
978-605-86311-1-3
