Combining convex hull and directed graph for fast and accurate ellipse detection

IF 2.5 4区计算机科学 Q2 COMPUTER SCIENCE, SOFTWARE ENGINEERING

Graphical Models Pub Date : 2021-07-01 DOI:10.1016/j.gmod.2021.101110

Zeyu Shen , Mingyang Zhao , Xiaohong Jia , Yuan Liang , Lubin Fan , Dong-Ming Yan

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引用次数: 7

Abstract

Detecting ellipses from images is a fundamental task in many computer vision applications. However, due to the complexity of real-world scenarios, it is still a challenge to detect ellipses accurately and efficiently. In this paper, we propose a novel method to tackle this problem based on the fast computation of convex hull and directed graph, which achieves promising results on both accuracy and efficiency. We use Depth-First-Search to extract branch-free curves after adaptive edge detection. Line segments are used to represent the curvature characteristic of the curves, followed by splitting at sharp corners and inflection points to attain smooth arcs. Then the convex hull is constructed, together with the distance, length, and direction constraints, to find co-elliptic arc pairs. Arcs and their connectivity are encoded into a sparse directed graph, and then ellipses are generated via a fast access of the adjacency list. Finally, salient ellipses are selected subject to strict verification and weighted clustering. Extensive experiments are conducted on eight real-world datasets (six publicly available and two built by ourselves), as well as five synthetic datasets. Our method achieves the overall highest F-measure with competitive speed compared to representative state-of-the-art methods.

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结合凸包和有向图实现快速准确的椭圆检测

从图像中检测椭圆是许多计算机视觉应用的基本任务。然而，由于现实场景的复杂性，准确高效地检测椭圆仍然是一个挑战。本文提出了一种基于凸包和有向图快速计算的新方法来解决这一问题，在精度和效率上都取得了令人满意的结果。在自适应边缘检测后，采用深度优先搜索方法提取无分支曲线。线段用于表示曲线的曲率特征，然后在尖角和拐点处进行分裂以获得光滑的弧线。然后构造凸包，结合距离、长度和方向约束，求出共椭圆弧对。将圆弧及其连通性编码为稀疏有向图，然后通过快速访问邻接表生成椭圆。最后，通过严格的验证和加权聚类，选择显著省略号。广泛的实验在8个真实世界的数据集(6个公开可用，2个由我们自己建立)，以及5个合成数据集上进行。与具有代表性的最先进的方法相比，我们的方法以具有竞争力的速度实现了整体最高的f测量。

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

Graphical Models 工程技术-计算机：软件工程

CiteScore

3.60

自引率

5.90%

发文量

审稿时长

47 days

期刊介绍： Graphical Models is recognized internationally as a highly rated, top tier journal and is focused on the creation, geometric processing, animation, and visualization of graphical models and on their applications in engineering, science, culture, and entertainment. GMOD provides its readers with thoroughly reviewed and carefully selected papers that disseminate exciting innovations, that teach rigorous theoretical foundations, that propose robust and efficient solutions, or that describe ambitious systems or applications in a variety of topics. We invite papers in five categories: research (contributions of novel theoretical or practical approaches or solutions), survey (opinionated views of the state-of-the-art and challenges in a specific topic), system (the architecture and implementation details of an innovative architecture for a complete system that supports model/animation design, acquisition, analysis, visualization?), application (description of a novel application of know techniques and evaluation of its impact), or lecture (an elegant and inspiring perspective on previously published results that clarifies them and teaches them in a new way). GMOD offers its authors an accelerated review, feedback from experts in the field, immediate online publication of accepted papers, no restriction on color and length (when justified by the content) in the online version, and a broad promotion of published papers. A prestigious group of editors selected from among the premier international researchers in their fields oversees the review process.