Semiparametric inference using fractional posteriors | allainews.com

Feb. 7, 2024, 5:46 a.m. | Alice L'Huillier Luke Travis Isma\"el Castillo Kolyan Ray

stat.ML updates on arXiv.org arxiv.org

We establish a general Bernstein--von Mises theorem for approximately linear semiparametric functionals of fractional posterior distributions based on nonparametric priors. This is illustrated in a number of nonparametric settings and for different classes of prior distributions, including Gaussian process priors. We show that fractional posterior credible sets can provide reliable semiparametric uncertainty quantification, but have inflated size. To remedy this, we further propose a \textit{shifted-and-rescaled} fractional posterior set that is an efficient confidence set having optimal size under regularity conditions. …

credible general inference linear math.st posterior prior process quantification show stat.ml stat.th theorem uncertainty

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