Direct Sampling of Bayesian Thin-Plate Splines for Spatial Smoothing
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Radial basis functions are a common mathematical tool used to construct a smooth interpolating function from a set of data points. A spatial prior based on thin-plate spline radial basis functions can be easily implemented resulting in a posterior that can be sampled directly using Monte Carlo integration, avoiding the computational burden and potential inefficiency of an Monte Carlo Markov Chain (MCMC) sampling scheme. The derivation of the prior and sampling scheme are demonstrated.
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