Abstract
We consider the Bayes estimator $\delta_0$ for a Gaussian signal process observed in the presence of additive Gaussian noise under contamination of the signal or noise by QN-laws, introduced by Gualtierotti (1979). Upper bounds on the increase in the mean square error of $\delta_0$ over the minimum possible mean square error under contaminated noise or contaminated signal are given. It is shown that the performance of $\delta_0$ is relatively close to optimal for small amounts of contamination.
Citation
Ian W. McKeague. "On the Stability of Bayes Estimators for Gaussian Processes." Ann. Statist. 12 (4) 1310 - 1323, December, 1984. https://doi.org/10.1214/aos/1176346794
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