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Martins A. F. T., Figueiredo M. A. T., Aguiar P. M. Q., Smith N. A., Xing E. P.

Journal of Machine Learning Research
2015

pp 495

-
545

Abstract:

We present AD3 a new algorithm for approximate maximum a posteriori (MAP) inference on factor graphs, based on the alternating directions method of multipliers. Like other dual decomposition algorithms, AD3 has a modular architecture, where local subproblems are solved independently, and their solutions are gathered to compute a global update. The key characteristic of AD3
is that each local subproblem has a quadratic regularizer, leading
to faster convergence, both theoretically and in practice. We provide closed-form solutions for these AD3 subproblems for binary pairwise factors and factors imposing first-order logic constraints. For arbitrary factors (large or combinatorial), we introduce an active set method which requires only an oracle for computing a local MAP configuration, making AD3 applicable to a wide range of problems. Experiments on synthetic and real-world problems show that AD3
compares favorably with the state-of-the-art.
Keywords: MAP inference, graphical models, dual decomposition, alternating directions method of multipliers.