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The Potts model has enjoyed much success as a prior model for image segmentation. Given the individual classes in the model, the data are typically modeled as Gaussian random variates or as random variates from some other parametric distribution. In this article, we present a non-parametric Potts model and apply it to a functional magnetic resonance imaging study for the pre-surgical assessment of peritumoral brain activation. In our model, we assume that the Z-score image from a patient can be segmented into activated, deactivated, and null classes, or states. Conditional on the class, or state, the Z-scores are assumed to come from some generic distribution which we model non-parametrically using a mixture of Dirichlet process priors within the Bayesian framework. The posterior distribution of the model parameters is estimated with a Markov chain Monte Carlo algorithm, and Bayesian decision theory is used to make the final classifications. Our Potts prior model includes two parameters, the standard spatial regularization parameter and a parameter that can be interpreted as the a priori probability that each voxel belongs to the null, or background state, conditional on the lack of spatial regularization. We assume that both of these parameters are unknown, and jointly estimate them along with other model parameters. We show through simulation studies that our model performs on par, in terms of posterior expected loss, with parametric Potts models when the parametric model is correctly specified and outperforms parametric models when the parametric model in misspecified.

Original publication

DOI

10.1177/0962280212448970

Type

Conference paper

Publication Date

08/2013

Volume

22

Pages

364 - 381

Keywords

Dirichlet process, FMRI, Potts model, decision theory, hidden Markov random field, non-parametric Bayes, Algorithms, Bayes Theorem, Biostatistics, Brain Neoplasms, Computer Simulation, Decision Theory, Humans, Image Interpretation, Computer-Assisted, Magnetic Resonance Imaging, Markov Chains, Monte Carlo Method, Normal Distribution, Statistics, Nonparametric