Rasterization of nonparametric curves

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Rasterization of nonparametric curves

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ACM Transactions on Graphics (TOG) archive
Volume 9 , Issue 3 (July 1990) table of contents

Pages: 262 - 277

Year of Publication: 1990

ISSN:0730-0301

Author

John D. Hobby

AT&T Bell Labs, Murray Hill, NJ

Publisher

ACM New York, NY, USA

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Downloads (6 Weeks): 2, Downloads (12 Months): 49, Citation Count: 4

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ABSTRACT

We examine a class of algorithms for rasterizing algebraic curves based on an implicit form that can be evaluated cheaply in integer arithmetic using finite differences. These algorithms run fast and produce “optimal” digital output, where previously known algorithms have had serious limitations. We extend previous work on conic sections to the cubic and higher order curves, and we solve an important undersampling problem.

REFERENCES

Note: OCR errors may be found in this Reference List extracted from the full text article. ACM has opted to expose the complete List rather than only correct and linked references.

	1	BOROFSK~, S. Elementary Theory of Equations. Macmillan, New York, 1950.
	2	FREEMAN, H. On the encoding of arbitrary geometric configurations. IRE Trans. Electron. Comput. EC-IO, 2 (June 1961), 260-268.
	3	FREEMAN, H. On the quantization of line-drawing data. IEEE Trans. Syst. ScL Cybern. 5, 1 (Jan. 1969), 70-79.
	4	John Douglas Hobby, Digitized brush trajectories (raster, algorithms), 1985
	5	HOBBY, J.D. Non-parametric digitization algorithms. Comput. Sci. Tech. Rep. 125, AT&T Bell Laboratories, Murray Hill, N.J., 1986.
	6	John D. Hobby, Rasterizing curves of constant width, Journal of the ACM (JACM), v.36 n.2, p.209-229, April 1989 [doi>10.1145/62044.62045]
	7	John D. Hobby, Numerically stable implicitization of cubic curves, ACM Transactions on Graphics (TOG), v.10 n.3, p.255-296, July 1991 [doi>10.1145/108541.108546]
	8	Donald E. Knuth, The art of computer programming, volume 1 (3rd ed.): fundamental algorithms, Addison Wesley Longman Publishing Co., Inc., Redwood City, CA, 1997
	9	KNUTH, D.E. Computers and Typesetting. Vol. D, Metafont: The Program, Addison-Wesley, Reading, Mass., 1986.
	10	Richard R. Patterson, Parametric cubics as algebraic curves, Computer Aided Geometric Design, v.5 n.2, p.139-160, July 1988 [doi>10.1016/0167-8396(88)90028-3]
	11	PITTEWAY, M. L.V. Algorithm for drawing ellipses or hyperbolae with a digital plotter. Comput. J. 10, 3 (Nov. 1967), 282-289.
	12	Vaughan Pratt, Techniques for conic splines, ACM SIGGRAPH Computer Graphics, v.19 n.3, p.151-160, Jul. 1985
	13	Thomas Warren Sederberg, Implicit and parametric curves and surfaces for computer aided geometric design, 1983
	14	SEDERBERG, W. W., ANDERSON, D. C., AND GOLDMAN, R.N. Implicitization, inversion and intersection of planar rational cubic curves. Comput. Vision Graph. Image Process. 31, 1 (July 1985), 89-102.
	15	Jerry Van Aken , Mark Novak, Curve-drawing algorithms for Raster displays, ACM Transactions on Graphics (TOG), v.4 n.2, p.147-169, April 1985 [doi>10.1145/282918.282943]

CITED BY 4

	Gabriel Taubin, An accurate algorithm for rasterizing algebraic curves, Proceedings on the second ACM symposium on Solid modeling and applications, p.221-230, May 19-21, 1993, Montreal, Quebec, Canada
	Jean Gallier, A simple method for drawing a rational curve as two Bézier segments, ACM Transactions on Graphics (TOG), v.18 n.4, p.316-328, Oct. 1999
	John D. Hobby, Numerically stable implicitization of cubic curves, ACM Transactions on Graphics (TOG), v.10 n.3, p.255-296, July 1991
	Gabriel Taubin, Distance approximations for rasterizing implicit curves, ACM Transactions on Graphics (TOG), v.13 n.1, p.3-42, Jan. 1994

INDEX TERMS

Primary Classification:
I. Computing Methodologies
I.3 COMPUTER GRAPHICS
I.3.3 Picture/Image Generation
Subjects: Display algorithms

Additional Classification:
I. Computing Methodologies
I.3 COMPUTER GRAPHICS
I.3.5 Computational Geometry and Object Modeling
Subjects: Geometric algorithms, languages, and systems

General Terms:
Algorithms, Theory

REVIEW

"Patrick Gilles Maillot, Jr. : Reviewer"

Hobby presents an analysis of a class of algorithms for rasterizing nonparametric curves using integer arithmetic. In an introduction, he presents a canonical definition of rasterization that is also valid for spline-bounded regions. Hobby men more...

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John D. Hobby: colleagues

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