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Autori principali: Lei, Huan, Li, Hongdong, Geiger, Andreas, Dick, Anthony
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2412.13502
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author Lei, Huan
Li, Hongdong
Geiger, Andreas
Dick, Anthony
author_facet Lei, Huan
Li, Hongdong
Geiger, Andreas
Dick, Anthony
contents 3D shape analysis has been largely focused on traditional 3D representations of point clouds and meshes, but the discrete nature of these data makes the analysis susceptible to variations in input resolutions. Recent development of neural fields brings in level-set parameters from signed distance functions as a novel, continuous, and numerical representation of 3D shapes, where the shape surfaces are defined as zero-level-sets of those functions. This motivates us to extend shape analysis from the traditional 3D data to these novel parameter data. Since the level-set parameters are not Euclidean like point clouds, we establish correlations across different shapes by formulating them as a pseudo-normal distribution, and learn the distribution prior from the respective dataset. To further explore the level-set parameters with shape transformations, we propose to condition a subset of these parameters on rotations and translations, and generate them with a hypernetwork. This simplifies the pose-related shape analysis compared to using traditional data. We demonstrate the promise of the novel representations through applications in shape classification (arbitrary poses), retrieval, and 6D object pose estimation.
format Preprint
id arxiv_https___arxiv_org_abs_2412_13502
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Level-Set Parameters: Novel Representation for 3D Shape Analysis
Lei, Huan
Li, Hongdong
Geiger, Andreas
Dick, Anthony
Computer Vision and Pattern Recognition
3D shape analysis has been largely focused on traditional 3D representations of point clouds and meshes, but the discrete nature of these data makes the analysis susceptible to variations in input resolutions. Recent development of neural fields brings in level-set parameters from signed distance functions as a novel, continuous, and numerical representation of 3D shapes, where the shape surfaces are defined as zero-level-sets of those functions. This motivates us to extend shape analysis from the traditional 3D data to these novel parameter data. Since the level-set parameters are not Euclidean like point clouds, we establish correlations across different shapes by formulating them as a pseudo-normal distribution, and learn the distribution prior from the respective dataset. To further explore the level-set parameters with shape transformations, we propose to condition a subset of these parameters on rotations and translations, and generate them with a hypernetwork. This simplifies the pose-related shape analysis compared to using traditional data. We demonstrate the promise of the novel representations through applications in shape classification (arbitrary poses), retrieval, and 6D object pose estimation.
title Level-Set Parameters: Novel Representation for 3D Shape Analysis
topic Computer Vision and Pattern Recognition
url https://arxiv.org/abs/2412.13502