Planar Cycle Covering Graphs
Abstract
We describe a new variational lower-bound on the minimum energy configuration of a planar binary Markov Random Field (MRF). Our method is based on adding auxiliary nodes to every face of a planar embedding of the graph in order to capture the effect of unary potentials. A ground state of the resulting approximation can be computed efficiently by reduction to minimum-weight perfect matching. We show that optimization of variational parameters achieves the same lower-bound as dual-decomposition into the set of all cycles of the original graph. We demonstrate that our variational optimization converges quickly and provides high-quality solutions to hard combinatorial problems 10-100x faster than competing algorithms that optimize the same bound.
Keywords
Cite
@article{arxiv.1104.1204,
title = {Planar Cycle Covering Graphs},
author = {Julian Yarkony and Alexander T. Ihler and Charless C. Fowlkes},
journal= {arXiv preprint arXiv:1104.1204},
year = {2011}
}