Abstract

Variants of max-product (MP) belief propagation effectively find modes of many complex graphical models, but are limited to discrete distributions. Diverse particle max-product (D-PMP) robustly approximates max-product updates in continuous MRFs using stochastically sampled particles, but previous work was specialized to treestructured models. Motivated by the challenging problem of protein side chain prediction, we extend D-PMP in several key ways to create a generic MAP inference algorithm for loopy models. We define a modified diverse particle selection objective that is provably submodular, leading to an efficient greedy algorithm with rigorous optimality guarantees, and corresponding maxmarginal error bounds. We further incorporate tree-reweighted variants of the MP algorithm to allow provable verification of global MAP recovery in many models. Our general-purpose MATLAB library is applicable to a wide range of pairwise graphical models, and we validate our approach using optical flow benchmarks. We further demonstrate superior side chain prediction accuracy compared to baseline algorithms from the state-of-the-art Rosetta package.