Maximum Persistency via Iterative Relaxed Inference with Graphical Models

August 31, 2015 Β· Declared Dead Β· πŸ› IEEE Transactions on Pattern Analysis and Machine Intelligence

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Authors Alexander Shekhovtsov, Paul Swoboda, Bogdan Savchynskyy arXiv ID 1508.07902 Category cs.CV: Computer Vision Cross-listed cs.DS Citations 2 Venue IEEE Transactions on Pattern Analysis and Machine Intelligence Last Checked 4 months ago
Abstract
We consider the NP-hard problem of MAP-inference for undirected discrete graphical models. We propose a polynomial time and practically efficient algorithm for finding a part of its optimal solution. Specifically, our algorithm marks some labels of the considered graphical model either as (i) optimal, meaning that they belong to all optimal solutions of the inference problem; (ii) non-optimal if they provably do not belong to any solution. With access to an exact solver of a linear programming relaxation to the MAP-inference problem, our algorithm marks the maximal possible (in a specified sense) number of labels. We also present a version of the algorithm, which has access to a suboptimal dual solver only and still can ensure the (non-)optimality for the marked labels, although the overall number of the marked labels may decrease. We propose an efficient implementation, which runs in time comparable to a single run of a suboptimal dual solver. Our method is well-scalable and shows state-of-the-art results on computational benchmarks from machine learning and computer vision.
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