.This paper analyzes hierarchical Bayesian inverse problems using techniques from high-dimensional statistics. Our analysis leverages a property of hierarchical Bayesian regularizers that we call approximate decomposability to obtain nonasymptotic bounds on the reconstruction error attained by maximum a posteriori estimators. The new theory explains how hierarchical Bayesian models that exploit sparsity, group sparsity, and sparse representations of the unknown parameter can achieve accurate reconstructions in high-dimensional settings.Keywordshierarchical Bayesian inverse problemshigh-dimensional statisticsMAP estimationnonasymptotic error boundsMSC codes65M3262C1065F22
Sanz-Alonso et al. (Thu,) studied this question.
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