Abstract
We investigate the asymptotic optimality of several Bayesian wavelet estimators,
namely, posterior mean, posterior median and Bayes Factor, where
the prior imposed on wavelet coefficients is a mixture of a mass function at
zero and a Gaussian
density. We show that in terms of the mean squared error,
for the properly chosen hyperparameters of the prior
all the three resulting Bayesian wavelet estimators achieve optimal minimax
rates within any prescribed Besov space $B^{s}_{p,q}$ for $p \geq 2$.
For $1 \leq p < 2$, the Bayes Factor is still optimal for
$(2s+2)/(2s+1) \leq p < 2$ and always outperforms the posterior
mean and the posterior median that can achieve only the best possible
rates for linear estimators in this case.
Anno
2004
Autori IAC
Tipo pubblicazione
Altri Autori
Abramovich F.; Amato U.; Angelini C.
Editore
Blackwell Publishers.
Rivista
Scandinavian journal of statistics