We consider the problem of constructing Bayesian based confidence sets for linear functionals in the inverse Gaussian white noise model. We work with a scale of Gaussian priors indexed by a regularity hyper-parameter and apply the data-driven (slightly modified) marginal likelihood empirical Bayes method for the choice of this hyper-parameter. We show by theory and simulations that the credible sets constructed by this method have sub-optimal behaviour in general. However, by assuming “self-similarity” the credible sets have rate-adaptive size and optimal coverage. As an application of these results we construct L∞-credible bands for the true functional parameter with adaptive size and optimal coverage under self-similarity constraint.
On Bayesian based adaptive confidence sets for linear functionals
Szabo, Botond
2015
Abstract
We consider the problem of constructing Bayesian based confidence sets for linear functionals in the inverse Gaussian white noise model. We work with a scale of Gaussian priors indexed by a regularity hyper-parameter and apply the data-driven (slightly modified) marginal likelihood empirical Bayes method for the choice of this hyper-parameter. We show by theory and simulations that the credible sets constructed by this method have sub-optimal behaviour in general. However, by assuming “self-similarity” the credible sets have rate-adaptive size and optimal coverage. As an application of these results we construct L∞-credible bands for the true functional parameter with adaptive size and optimal coverage under self-similarity constraint.
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