[Forum SIS] Seminario BOCHKINA

Ven 4 Maggio 2012 15:25:10 CEST

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CICLO DI SEMINARI  -  COLLEGIO CARLO ALBERTO
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Nell'ambito del ciclo di seminari organizzato dalla
"de Castro" Statistics Initiative (http://www.carloalberto.org/stats),
alle ore 12.00 di Venerdi' 11 Maggio 2012,
presso la Sala Rossa del Collegio Carlo Alberto,
via Real Collegio 30, 10024, Moncalieri (TO),
si terra' il seguente seminario:

NATALIA BOCHKINA (University of Edimburgh, UK)

THE BERNSTEIN - VON MISES THEOREM: RELAXING ITS 
ASSUMPTIONS AND EXTENDING IT TO NONREGULAR MODELS

Abstract:
The Bernstein - von Mises theorem is an important result in Bayesian asymptotics, giving conditions under which the posterior distribution of a finite-dimensional parameter can be approximated by the Gaussian distribution. On one hand, this result quantifies consistency and efficiency of Bayesian procedures which
makes them ``optimal'' from the frequentist point of view, and, on the other hand,  it justifies Gaussian approximation of the posterior distribution commonly used, for instance, to simplify computation of the normalising constant and to estimate the accuracy of MCMC-based posterior summaries.
In this talk I will focus on the extensions of the Bernstein – von Mises theorem in three directions. Firstly, I will give a nonasymptotic formulation of the Bernstein – von Mises theorem under possible model misspecification. It allows quantification of the effect of model misspecification and of the sample size on the posterior distribution, in particular, when constructing the approximate credible intervals. Secondly, I will state the approximation of the posterior distribution for so called nonregular distributions, where the true value of the parameter lies on the boundary of the parameter space that occurs, for example, in image analysis and in econometrics. In these cases, the approximation of the posterior distribution is no longer Gaussian, and the convergence is faster than for the regular models. And finally, this result will also be stated for non-identifiable nonregular models, e.g. ill-posed inverse problems, where Bayesian regularisation is essential.

This work is joint with Vladimir Spokoiny (WIAS, Germany) and Peter Green (University of Bristol, UK).

Tutti gli interessati sono invitati a partecipare.

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Matteo Ruggiero
University of Torino & Collegio Carlo Alberto
http://web.econ.unito.it/ruggiero

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