Title :
Variational Estimation in Spatiotemporal Systems From Continuous and Point-Process Observations
Author :
Zammit-Mangion, Andrew ; Sanguinetti, Guido ; Kadirkamanathan, Visakan
Author_Institution :
Sch. of Inf., Univ. of Edinburgh, Edinburgh, UK
fDate :
7/1/2012 12:00:00 AM
Abstract :
Spatiotemporal models are ubiquitous in science and engineering, yet estimation in these models from discrete observations remains computationally challenging. We propose a practical novel approach to inference in spatiotemporal processes, both from continuous and from discrete (point-process) observations. The method is based on a finite-dimensional reduction of the spatiotemporal model, followed by a mean field variational approximate inference approach. To cater for the point-process case, a variational-Laplace approach is proposed which yields tractable computations of approximate variational posteriors. Results show that variational Bayes is a viable and practical alternative to statistical methods such as expectation maximization or Markov chain Monte Carlo.
Keywords :
Bayes methods; approximation theory; differential equations; spatiotemporal phenomena; variational techniques; Markov chain Monte Carlo method; continuous observations; discrete observations; expectation maximization method; finite-dimensional reduction; mean field variational approximation inference approach; point-process observations; spatiotemporal systems; variational Bayes method; variational estimation; variational posteriors approximation; variational-Laplace approach; Approximation methods; Equations; Mathematical model; Moment methods; Sensors; Spatiotemporal phenomena; Stochastic processes; Dynamic spatiotemporal modeling; spatiotemporal point-processes; stochastic partial differential equations; variational Bayes; variational-Laplace;
Journal_Title :
Signal Processing, IEEE Transactions on
DOI :
10.1109/TSP.2012.2191966
