Reliability-based G1 continuous arc spline approximation

IF 1.3 4区计算机科学 Q3 COMPUTER SCIENCE, SOFTWARE ENGINEERING Computer Aided Geometric Design Pub Date : 2024-06-14 DOI:10.1016/j.cagd.2024.102363

Jinhwan Jeon , Yoonjin Hwang , Seibum B. Choi

引用次数: 0

Abstract

This paper introduces an algorithm for approximating a set of data points with $G^{1}$ continuous arcs, leveraging covariance data associated with the points. Prior approaches to arc spline approximation typically assumed equal contribution from all data points, resulting in potential algorithmic instability when outliers are present. To address this challenge, we propose a robust method for arc spline approximation, taking into account the 2D covariance of each data point. Beginning with the definition of models and parameters for single-arc approximation, we extend the framework to support multiple-arc approximation for broader applicability. Finally, we validate the proposed algorithm using both synthetic noisy data and real-world data collected through vehicle experiments conducted in Sejong City, South Korea.

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基于可靠性的 G1 连续弧样条近似法

本文介绍了一种利用与数据点相关的协方差数据，用 G1 连续弧线近似一组数据点的算法。之前的弧样条近似方法通常假定所有数据点的贡献相等，当出现异常值时，可能导致算法不稳定。为了应对这一挑战，我们提出了一种考虑到每个数据点二维协方差的弧样条近似稳健方法。从定义单弧线近似的模型和参数开始，我们扩展了框架以支持多弧线近似，从而获得更广泛的适用性。最后，我们利用在韩国世宗市进行的车辆实验收集的合成噪声数据和实际数据验证了所提出的算法。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Computer Aided Geometric Design 工程技术-计算机：软件工程

CiteScore

3.50

自引率

13.30%

发文量

审稿时长

60 days

期刊介绍： The journal Computer Aided Geometric Design is for researchers, scholars, and software developers dealing with mathematical and computational methods for the description of geometric objects as they arise in areas ranging from CAD/CAM to robotics and scientific visualization. The journal publishes original research papers, survey papers and with quick editorial decisions short communications of at most 3 pages. The primary objects of interest are curves, surfaces, and volumes such as splines (NURBS), meshes, subdivision surfaces as well as algorithms to generate, analyze, and manipulate them. This journal will report on new developments in CAGD and its applications, including but not restricted to the following: -Mathematical and Geometric Foundations- Curve, Surface, and Volume generation- CAGD applications in Numerical Analysis, Computational Geometry, Computer Graphics, or Computer Vision- Industrial, medical, and scientific applications. The aim is to collect and disseminate information on computer aided design in one journal. To provide the user community with methods and algorithms for representing curves and surfaces. To illustrate computer aided geometric design by means of interesting applications. To combine curve and surface methods with computer graphics. To explain scientific phenomena by means of computer graphics. To concentrate on the interaction between theory and application. To expose unsolved problems of the practice. To develop new methods in computer aided geometry.