An Enhanced Structure-from-Motion Paradigm Based on the Absolute Dual Quadric and Images of Circular Points

L. Calvet, Pierre Gurdjos
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引用次数: 2

Abstract

This work aims at introducing a new unified Structure from Motion (SfM) paradigm in which images of circular point-pairs can be combined with images of natural points. An imaged circular point-pair encodes the 2D Euclidean structure of a world plane and can easily be derived from the image of a planar shape, especially those including circles. A classical SfM method generally runs two steps: first a projective factorization of all matched image points (into projective cameras and points) and second a camera self calibration that updates the obtained world from projective to Euclidean. This work shows how to introduce images of circular points in these two SfM steps while its key contribution is to provide the theoretical foundations for combining "classical" linear self-calibration constraints with additional ones derived from such images. We show that the two proposed SfM steps clearly contribute to better results than the classical approach. We validate our contributions on synthetic and real images.
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一种基于绝对对偶二次曲线和圆点图像的增强运动构造范式
这项工作旨在引入一种新的统一运动结构(SfM)范式,其中圆形点对的图像可以与自然点的图像相结合。圆形点对成像编码了世界平面的二维欧几里得结构,并且可以很容易地从平面形状的图像中导出,特别是那些包含圆的图像。经典的SfM方法一般分为两个步骤:首先对所有匹配的图像点进行投影分解(分为投影相机和投影点),然后进行相机自校准,将得到的世界从投影更新为欧几里得。这项工作展示了如何在这两个SfM步骤中引入圆形点的图像,而其关键贡献是为将“经典”线性自校准约束与从此类图像派生的附加约束相结合提供了理论基础。我们表明,两种提出的SfM步骤明显比经典方法有更好的结果。我们在合成图像和真实图像上验证了我们的贡献。
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