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Markov Random Field (MRF) prior

We would like to consider a model which spatially regularises the AR parameters. To do this we use a Markov Random Field (MRF) pairwise difference Gaussian prior (37) on the field $ \alpha_p\equiv(\alpha_{pi})$:
$\displaystyle p(\alpha_p\vert\phi_{\alpha_p})$ $\displaystyle \propto$ $\displaystyle \phi_{\alpha_p}^{N/2} \exp \left\{ \frac{-\phi_{\alpha_p}}{4}\sum_i \sum_{j\in{\cal N}_{i}} (\alpha_{pi}-\alpha_{pj})^2 \right\}$  
      (14)

where $ j\in{\cal N}_{i}$ is the set of neighbouring voxels to voxel $ i$ (for this we use 26-connectivity in 3D). Note that the parameter controlling the amount of spatial regularisation, $ \phi _{\alpha _p}$, is determined adaptively from the data (see section 3.3.6).