The $f$-Divergence Expectation Iteration Scheme
Abstract
This paper introduces the -EI algorithm, a novel iterative algorithm which operates on measures and performs -divergence minimisation in a Bayesian framework. We prove that for a rich family of values of this algorithm leads at each step to a systematic decrease in the -divergence and show that we achieve an optimum. In the particular case where we consider a weighted sum of Dirac measures and the -divergence, we obtain that the calculations involved in the -EI algorithm simplify to gradient-based computations. Empirical results support the claim that the -EI algorithm serves as a powerful tool to assist Variational methods.
Cite
@article{arxiv.1909.12239,
title = {The $f$-Divergence Expectation Iteration Scheme},
author = {Kamélia Daudel and Randal Douc and François Portier and François Roueff},
journal= {arXiv preprint arXiv:1909.12239},
year = {2021}
}
Comments
This content ended up being split into the papers arXiv:2005.10618 and arXiv:2103.05684, which correspond to two separate and more in-depth approaches