Roubtsova Nadejda, Guillemaut Jean-Yves
IEEE Trans Pattern Anal Mach Intell. 2018 Sep;40(9):2265-2272. doi: 10.1109/TPAMI.2017.2749373. Epub 2017 Sep 22.
Helmholtz Stereopsis is a 3D reconstruction method uniquely independent of surface reflectance. Yet, its sub-optimal maximum likelihood formulation with drift-prone normal integration limits performance. Via three contributions this paper presents a complete novel pipeline for Helmholtz Stereopsis. First, we propose a Bayesian formulation replacing the maximum likelihood problem by a maximum a posteriori one. Second, a tailored prior enforcing consistency between depth and normal estimates via a novel metric related to optimal surface integrability is proposed. Third, explicit surface integration is eliminated by taking advantage of the accuracy of prior and high resolution of the coarse-to-fine approach. The pipeline is validated quantitatively and qualitatively against alternative formulations, reaching sub-millimetre accuracy and coping with complex geometry and reflectance.
亥姆霍兹立体视觉是一种独特的、与表面反射率无关的三维重建方法。然而,其具有易漂移的法线积分的次优最大似然公式限制了性能。通过三项贡献,本文提出了一种全新的亥姆霍兹立体视觉处理流程。首先,我们提出了一种贝叶斯公式,用最大后验问题取代最大似然问题。其次,通过一种与最优表面可积性相关的新度量,提出了一种定制先验,以增强深度估计和法线估计之间的一致性。第三,利用先验的准确性和粗到细方法的高分辨率,消除了显式表面积分。该处理流程针对其他公式进行了定量和定性验证,达到了亚毫米级的精度,并能处理复杂的几何形状和反射率。
