3 research outputs found
Block Stability for MAP Inference
To understand the empirical success of approximate MAP inference, recent work
(Lang et al., 2018) has shown that some popular approximation algorithms
perform very well when the input instance is stable. The simplest stability
condition assumes that the MAP solution does not change at all when some of the
pairwise potentials are (adversarially) perturbed. Unfortunately, this strong
condition does not seem to be satisfied in practice. In this paper, we
introduce a significantly more relaxed condition that only requires blocks
(portions) of an input instance to be stable. Under this block stability
condition, we prove that the pairwise LP relaxation is persistent on the stable
blocks. We complement our theoretical results with an empirical evaluation of
real-world MAP inference instances from computer vision. We design an algorithm
to find stable blocks, and find that these real instances have large stable
regions. Our work gives a theoretical explanation for the widespread empirical
phenomenon of persistency for this LP relaxation