English

Block-Value Symmetries in Probabilistic Graphical Models

Artificial Intelligence 2018-07-10 v2

Abstract

One popular way for lifted inference in probabilistic graphical models is to first merge symmetric states into a single cluster (orbit) and then use these for downstream inference, via variations of orbital MCMC [Niepert, 2012]. These orbits are represented compactly using permutations over variables, and variable-value (VV) pairs, but they can miss several state symmetries in a domain. We define the notion of permutations over block-value (BV) pairs, where a block is a set of variables. BV strictly generalizes VV symmetries, and can compute many more symmetries for increasing block sizes. To operationalize use of BV permutations in lifted inference, we describe 1) an algorithm to compute BV permutations given a block partition of the variables, 2) BV-MCMC, an extension of orbital MCMC that can sample from BV orbits, and 3) a heuristic to suggest good block partitions. Our experiments show that BV-MCMC can mix much faster compared to vanilla MCMC and orbital MCMC.

Keywords

Cite

@article{arxiv.1807.00643,
  title  = {Block-Value Symmetries in Probabilistic Graphical Models},
  author = {Gagan Madan and Ankit Anand and Mausam and Parag Singla},
  journal= {arXiv preprint arXiv:1807.00643},
  year   = {2018}
}

Comments

11 pages, 3 figures, Accepted in UAI 2018 and StaR AI 2018

R2 v1 2026-06-23T02:48:07.150Z