A Geometric Variational Approach to Bayesian Inference

Article

Saha, Abhijoy; Bharath, Karthik; Kurtek, Sebastian

University System of Ohio; Ohio State University; University of Nottingham

JOURNAL OF THE AMERICAN STATISTICAL ASSOCIATION

0162-1459

10.1080/01621459.2019.1585253

2020

822-835

We propose a novel Riemannian geometric framework for variational inference in Bayesian models based on the nonparametric Fisher-Rao metric on the manifold of probability density functions. Under the square-root density representation, the manifold can be identified with the positive orthant of the unit hypersphere in , and the Fisher-Rao metric reduces to the standard metric. Exploiting such a Riemannian structure, we formulate the task of approximating the posterior distribution as a variational problem on the hypersphere based on the alpha-divergence. This provides a tighter lower bound on the marginal distribution when compared to, and a corresponding upper bound unavailable with, approaches based on the Kullback-Leibler divergence. We propose a novel gradient-based algorithm for the variational problem based on Frechet derivative operators motivated by the geometry of , and examine its properties. Through simulations and real data applications, we demonstrate the utility of the proposed geometric framework and algorithm on several Bayesian models. for this article are available online.