Variational Cumulant Expansions for Intractable Distributions
Abstract
Intractable distributions present a common difficulty in inference within the probabilistic knowledge representation framework and variational methods have recently been popular in providing an approximate solution. In this article, we describe a perturbational approach in the form of a cumulant expansion which, to lowest order, recovers the standdard Kullback-Leibler variational bound. Higher-order terms describe corrections on the variational approach without incurring much further computational cost. The relationship to other perturbational approaches such as TAP is also elucidated. We demonstrate the method on a particular class of undirected graphical models, Boltzmann machines, for which our simulation results confirm improved accuracy and enhanced stability during learning.
Cite
Text
Barber and van de Laar. "Variational Cumulant Expansions for Intractable Distributions." Journal of Artificial Intelligence Research, 1999. doi:10.1613/JAIR.567Markdown
[Barber and van de Laar. "Variational Cumulant Expansions for Intractable Distributions." Journal of Artificial Intelligence Research, 1999.](https://mlanthology.org/jair/1999/barber1999jair-variational/) doi:10.1613/JAIR.567BibTeX
@article{barber1999jair-variational,
title = {{Variational Cumulant Expansions for Intractable Distributions}},
author = {Barber, David and van de Laar, Piërre},
journal = {Journal of Artificial Intelligence Research},
year = {1999},
pages = {435-455},
doi = {10.1613/JAIR.567},
volume = {10},
url = {https://mlanthology.org/jair/1999/barber1999jair-variational/}
}