Related papers: Square Root Marginalization for Sliding-Window Bundle Adjustment

Square Root Marginalization for Sliding-Window Bundle Adjustment

URL: http://arxiv.org/abs/2109.02182v1
Date: Sun, 5 Sep 2021 23:22:38 GMT
Title: Square Root Marginalization for Sliding-Window Bundle Adjustment
Authors: Nikolaus Demmel, David Schubert, Christiane Sommer, Daniel Cremers, Vladyslav Usenko
Abstract summary: We propose a novel square root sliding-window bundle adjustment suitable for real-time odometry applications. We show that the proposed square root marginalization is algebraically equivalent to the conventional use of Schur complement (SC) on the Hessian. Our evaluation of visual and visual-inertial odometry on real-world datasets demonstrates that the proposed estimator is 36% faster than the baseline.
Score: 53.34552451834707
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: In this paper we propose a novel square root sliding-window bundle adjustment suitable for real-time odometry applications. The square root formulation pervades three major aspects of our optimization-based sliding-window estimator: for bundle adjustment we eliminate landmark variables with nullspace projection; to store the marginalization prior we employ a matrix square root of the Hessian; and when marginalizing old poses we avoid forming normal equations and update the square root prior directly with a specialized QR decomposition. We show that the proposed square root marginalization is algebraically equivalent to the conventional use of Schur complement (SC) on the Hessian. Moreover, it elegantly deals with rank-deficient Jacobians producing a prior equivalent to SC with Moore-Penrose inverse. Our evaluation of visual and visual-inertial odometry on real-world datasets demonstrates that the proposed estimator is 36% faster than the baseline. It furthermore shows that in single precision, conventional Hessian-based marginalization leads to numeric failures and reduced accuracy. We analyse numeric properties of the marginalization prior to explain why our square root form does not suffer from the same effect and therefore entails superior performance.

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