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Autores principales: Zhang, Zongliang, Li, Shuxiang, Huang, Xingwang, Wang, Zongyue
Formato: Preprint
Publicado: 2026
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Acceso en línea:https://arxiv.org/abs/2602.05602
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author Zhang, Zongliang
Li, Shuxiang
Huang, Xingwang
Wang, Zongyue
author_facet Zhang, Zongliang
Li, Shuxiang
Huang, Xingwang
Wang, Zongyue
contents Most existing robust fitting methods are designed for classical models, such as lines, circles, and planes. In contrast, fewer methods have been developed to robustly handle non-classical models, such as spiral curves, procedural character models, and free-form surfaces. Furthermore, existing methods primarily focus on reconstructing a single instance of a non-classical model. This paper aims to reconstruct multiple instances of non-classical models from noisy data. We formulate this multi-instance fitting task as an optimization problem, which comprises an estimator and an optimizer. Specifically, we propose a novel estimator based on the model-to-data error, capable of handling outliers without a predefined error threshold. Since the proposed estimator is non-differentiable with respect to the model parameters, we employ a meta-heuristic algorithm as the optimizer to seek the global optimum. The effectiveness of our method are demonstrated through experimental results on various non-classical models. The code is available at https://github.com/zhangzongliang/fitting.
format Preprint
id arxiv_https___arxiv_org_abs_2602_05602
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle Multi-instance robust fitting for non-classical geometric models
Zhang, Zongliang
Li, Shuxiang
Huang, Xingwang
Wang, Zongyue
Computer Vision and Pattern Recognition
Most existing robust fitting methods are designed for classical models, such as lines, circles, and planes. In contrast, fewer methods have been developed to robustly handle non-classical models, such as spiral curves, procedural character models, and free-form surfaces. Furthermore, existing methods primarily focus on reconstructing a single instance of a non-classical model. This paper aims to reconstruct multiple instances of non-classical models from noisy data. We formulate this multi-instance fitting task as an optimization problem, which comprises an estimator and an optimizer. Specifically, we propose a novel estimator based on the model-to-data error, capable of handling outliers without a predefined error threshold. Since the proposed estimator is non-differentiable with respect to the model parameters, we employ a meta-heuristic algorithm as the optimizer to seek the global optimum. The effectiveness of our method are demonstrated through experimental results on various non-classical models. The code is available at https://github.com/zhangzongliang/fitting.
title Multi-instance robust fitting for non-classical geometric models
topic Computer Vision and Pattern Recognition
url https://arxiv.org/abs/2602.05602