Direct least square fitting of ellipses

被引：1963

作者：

Fitzgibbon, A

Pilu, M

Fisher, RB

机构：

[1] Univ Oxford, Dept Engn Sci, Oxford OX1 3BJ, England

[2] Hewlett Packard Labs, Bristol BS12 6QZ, Avon, England

[3] Univ Edinburgh, Div Informat, Edinburgh EH1 2QL, Midlothian, Scotland

来源：

IEEE TRANSACTIONS ON PATTERN ANALYSIS AND MACHINE INTELLIGENCE | 1999年 / 21卷 / 05期

关键词：

algebraic models; ellipse fitting; least squares fitting; constrained minimization; generalized eigenvalue problem;

D O I：

10.1109/34.765658

中图分类号：

TP18 [人工智能理论];

学科分类号：

081104 ; 0812 ; 0835 ; 1405 ;

摘要：

This work presents a new efficient method for fitting ellipses to scattered data. Previous algorithms either fitted general conics or were computationally expensive. By minimizing the algebraic distance subject to the constraint 4ac - b(2) = 1, the new method incorporates the ellipticity constraint into the normalization factor. The proposed method combines several advantages: It is ellipse-specific, so that even bad data will always return an ellipse. It can be solved naturally by a generalized eigensystem. It is extremely robust, efficient, and easy to implement.

引用

页码：476 / 480

页数：5

共 19 条

[1] [Anonymous], [No title captured]
[2] [Anonymous], 1992, SHAPE DETECTION COMP
[3] FITTING CONIC SECTIONS TO SCATTERED DATA
BOOKSTEIN, FL
[J]. COMPUTER GRAPHICS AND IMAGE PROCESSING, 1979, 9 (01): : 56 - 71
[4] ELLIPSE DETECTION AND MATCHING WITH UNCERTAINTY
ELLIS, T
ABBOOD, A
BRILLAULT, B
[J]. IMAGE AND VISION COMPUTING, 1992, 10 (05) : 271 - 276
[5] Fitzgibbon A. W., 1998, THESIS U EDINBURGH
[6] Fitzgibbon A.W., 1995, P BRIT MACH VIS C BI
[7] LEAST-SQUARES FITTING OF CIRCLES AND ELLIPSES
GANDER, W
GOLUB, GH
STREBEL, R
[J]. BIT, 1994, 34 (04): : 558 - 578
[8] GNANADESIKAN R, 1977, METHODS STAT DATA AN
[9] Haralick R. M., 1992, COMPUTER ROBOT VISIO
[10] STATISTICAL BIAS OF CONIC FITTING AND RENORMALIZATION
KANATANI, K
[J]. IEEE TRANSACTIONS ON PATTERN ANALYSIS AND MACHINE INTELLIGENCE, 1994, 16 (03) : 320 - 326

← 1 2 →