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Author, Editor(s)

Author(s):

Eigenwillig, Arno
Kettner, Lutz
Schömer, Elmar
Wolpert, Nicola

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Not MPG Author(s):

Schömer, Elmar

BibTeX cite key*:

eksw-eecaccc-06

Title

Title*:

Exact, Efficient and Complete Arrangement Computation for Cubic Curves


EKSW-Cubics-CGTA-authprep.pdf (493.4 KB)

Journal

Journal Title*:

Computational Geometry

Journal's URL:

http://www.elsevier.com/locate/comgeo

Download URL
for the article:

http://dx.doi.org/10.1016/j.comgeo.2005.10.003

Language:

English

Publisher

Publisher's
Name:

Elsevier

Publisher's URL:

http://www.elsevier.com/

Publisher's
Address:

Amsterdam, The Netherlands

ISSN:

0925-7721

Vol, No, pp, Date

Volume*:

35

Number:

1-2

Publishing Date:

August 2006

Pages*:

36-73

Number of
VG Pages:

126

Page Start:


Page End:


Sequence Number:


DOI:


Note, Abstract, ©

Note:


(LaTeX) Abstract:

The Bentley-Ottmann sweep-line method can compute the
arrangement of planar curves, provided a number of geometric
primitives operating on the curves are available. We discuss the
reduction of the primitives to the analysis of curves and curve pairs,
and describe efficient realizations of these analyses
for planar algebraic curves of degree three or less. We
obtain a \emph{complete}, \emph{exact}, and \emph{efficient\/}
algorithm for computing arrangements of cubic curves.
Special cases of cubic curves are
conics as well as implicitized cubic splines and B\'ezier curves.

The algorithm is \emph{complete\/} in that it handles all possible
degeneracies such as tangential intersections and singularities.
It is \emph{exact\/} in that it provides the mathematically correct
result. It is \emph{efficient\/} in that it can handle hundreds of
curves with a quarter million of segments in the final arrangement.
The algorithm has been implemented in C\texttt{++} as an \textsc{Exacus}
library called \textsc{CubiX}.

URL for the Abstract:

http://dx.doi.org/10.1016/j.comgeo.2005.10.003

Categories,
Keywords:

Arrangements, Agebraic curves, Sweep-line algorithm, Robustness, Exact geometric computation

HyperLinks / References / URLs:

http://dx.doi.org/10.1016/j.comgeo.2005.10.003

Copyright Message:

Copyright © 2005 Elsevier B.V. All rights reserved.
This article has been published in Computational Geometry 35(1-2), August 2006, Pages 36-73.

Personal Comments:


Download
Access Level:

Public

Correlation

MPG Unit:

Max-Planck-Institut für Informatik



MPG Subunit:

Algorithms and Complexity Group

Appearance:

MPII WWW Server, MPII FTP Server, MPG publications list, university publications list, working group publication list, Fachbeirat, VG Wort


BibTeX Entry:

@ARTICLE{eksw-eecaccc-06,
AUTHOR = {Eigenwillig, Arno and Kettner, Lutz and Sch{\"o}mer, Elmar and Wolpert, Nicola},
TITLE = {Exact, Efficient and Complete Arrangement Computation for Cubic Curves},
JOURNAL = {Computational Geometry},
PUBLISHER = {Elsevier},
YEAR = {2006},
NUMBER = {1-2},
VOLUME = {35},
PAGES = {36--73},
ADDRESS = {Amsterdam, The Netherlands},
MONTH = {August},
ISBN = {0925-7721},
}


Entry last modified by Christine Kiesel, 02/07/2007
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Editor(s)
Arno Eigenwillig
Created
05/22/2006 03:35:29 PM
Revisions
2.
1.
0.

Editor(s)
Christine Kiesel
Arno Eigenwillig
Arno Eigenwillig

Edit Dates
07.02.2007 10:19:12
06/07/2006 05:45:00 PM
05/22/2006 03:35:29 PM

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