Theory for Reconstruction of an Unknown Number of Contaminant Sources using Probabilistic Inference

We address the inverse problem of source reconstruction for the difficult case of multiple sources when the number of sources is unknown a priori. The problem is solved using a Bayesian probabilistic inferential framework in which Bayesian probability theory is used to derive the posterior probabili...

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Bibliographic Details
Published in:Boundary-layer meteorology 2008-06, Vol.127 (3), p.359-394
Main Author: Yee, Eugene
Format: Article
Language:English
Subjects:
Adjoint systems
Algorithms
Analysis methods
Applied sciences
Atmospheric boundary layer
Atmospheric pollution
Atmospheric Protection/Air Quality Control/Air Pollution
Atmospheric Sciences
Bayesian analysis
Bayesian inference
Contaminants
Earth and Environmental Science
Earth Sciences
Exact sciences and technology
Lagrangian stochastic models
Markov chain Monte Carlo
Markov chains
Meteorology
Monte Carlo simulation
Original Paper
Pollution
Source reconstruction
Stochastic models
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Summary:We address the inverse problem of source reconstruction for the difficult case of multiple sources when the number of sources is unknown a priori. The problem is solved using a Bayesian probabilistic inferential framework in which Bayesian probability theory is used to derive the posterior probability density function for the number of sources and for the parameters (e.g., location, emission rate, release time and duration) that characterize each source. A mapping (source-receptor relationship) that relates a multiple source distribution to the concentration measurements made by an array of detectors is formulated based on a forward-time Lagrangian stochastic model. A computationally efficient methodology for determination of the likelihood function for the problem, based on an adjoint representation of the source-receptor relationship and realized in terms of a backward-time Lagrangian stochastic model, is described. An efficient computational algorithm based on a parallel tempered Metropolis-coupled reversible-jump Markov chain Monte Carlo (MCMC) method is formulated and implemented to draw samples from the posterior probability density function of the source parameters. This methodology allows the MCMC method to initiate jumps between the hypothesis spaces corresponding to different numbers of sources in the source distribution and, thereby, allows a sample from the full joint posterior distribution of the number of sources and the parameters for each source to be obtained. The proposed methodology for source reconstruction is tested using synthetic concentration data generated for cases involving two and three unknown sources.
ISSN:0006-8314
1573-1472
DOI:10.1007/s10546-008-9270-5