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Consensus Set Maximization with Guaranteed Global Optimality for Robust Geometry Estimation

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Li, Hongdong

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Institute of Electrical and Electronics Engineers (IEEE Inc)

Abstract

Finding the largest consensus set is one of the key ideas used by the original RANSAC for removing outliers in robust-estimation. However, because of its random and non-deterministic nature, RANSAC does not fulfill the goal of consensus set maximization exactly and optimally. Based on global optimization, this paper presents a new algorithm that solves the problem exactly. We reformulate the problem as a mixed integer programming (MIP), and solve it via a tailored branch-and-bound method, where the bounds are computed from the MIP's convex under-estimators. By exploiting the special structure of linear robust-estimation, the new algorithm is also made efficient from a computational point of view.

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Proceedings of IEEE International Conference on Computer Vision (ICCV 2009)

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2037-12-31