Abstract: | |
To solve the problem of relative camera pose estimation, a method using optimization with respect to the manifold is proposed. Firstly from maximum-a-posteriori (MAP) model to nonlinear least squares (NLS) model, the general state estimation model using optimization is derived. Then the camera pose estimation model is applied to the general state estimation model, while the parameterization of rigid body transformation is represented by Lie group/algebra. The jacobian of point-pose model with respect to Lie group/algebra is derived in detail and thus the optimization model of rigid body transformation is established. Experimental results show that compared with the original algorithms, the approaches with optimization can obtain higher accuracy both in rotation and translation, while avoiding the singularity of Euler angle parameterization of rotation. Thus the proposed method can estimate relative camera pose with high accuracy and robustness.
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License of this version: | CC BY 3.0 Unported - https://creativecommons.org/licenses/by/3.0/ |
Publication type: | Article |
Publishing status: | publishedVersion |
Publication date: | 2017 |
Keywords english: | Levenberg-Marquardt, Lie group/Algebra, Manifold, Optimization, Pose estimation, Cameras, Optimization, Rigid structures, State estimation, Camera pose estimation, Levenberg-Marquardt, Manifold, Maximum a posteriori models, Nonlinear least squares, Optimization modeling, Pose estimation, Rigid body transformation, Parameter estimation |
DDC: | 550 | Geowissenschaften |
Controlled keywords(GND): | Konferenzschrift |
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