Go to DBLP homepageMultivariate Priors and the Linearity of Optimal Bayesian Estimators under Gaussian Noise
Abstract: Consider the task of estimating a random vector $X$ from noisy observations $Y=X+Z$, where $Z$ is a standard normal vector, under the $L^{p}$ fidelity criterion. This work establishes that, for $1\leq p\leq 2$, the optimal Bayesian estimator is linear and positive definite if and only if the prior distribution on $X$ is a (non-degenerate) multivariate Gaussian. Furthermore, for $p > 2$, it is demonstrated that there are infinitely many priors that can induce such an estimator.
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