迭代最近点
启发式
计算机科学
离群值
点集注册
转化(遗传学)
刚性变换
算法
匹配(统计)
编码(集合论)
点(几何)
数据结构
人工智能
数学
点云
集合(抽象数据类型)
生物化学
化学
统计
几何学
基因
程序设计语言
操作系统
作者
Sofien Bouaziz,Andrea Tagliasacchi,Mark V. Pauly
摘要
Abstract Rigid registration of two geometric data sets is essential in many applications, including robot navigation, surface reconstruction, and shape matching. Most commonly, variants of the Iterative Closest Point (ICP) algorithm are employed for this task. These methods alternate between closest point computations to establish correspondences between two data sets, and solving for the optimal transformation that brings these correspondences into alignment. A major difficulty for this approach is the sensitivity to outliers and missing data often observed in 3D scans. Most practical implementations of the ICP algorithm address this issue with a number of heuristics to prune or reweight correspondences. However, these heuristics can be unreliable and difficult to tune, which often requires substantial manual assistance. We propose a new formulation of the ICP algorithm that avoids these difficulties by formulating the registration optimization using sparsity inducing norms. Our new algorithm retains the simple structure of the ICP algorithm, while achieving superior registration results when dealing with outliers and incomplete data. The complete source code of our implementation is provided at http://lgg.epfl.ch/sparseicp .
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