Graphics Reference
In-Depth Information
[ISO 88]
International Standards Organization,
International Standard Information Processing Systems
Computer Graphics - Graphical Kernel System for Three Dimensions (GKS-3D) Functional
Description
, ISO Document Number 8805:1988(E), American National Standards Institute,
New York, 1988.
Kempf, Renate, and Frazier, Chris, Editors,
OpenGL Reference Manual
, 2
nd
Edition, Addison-
Wesley Developers Press, 1997.
[KemF97]
[Timm96]
Timmins, Bret,
DirectDraw Programming
, M&T Books, 1996.
[VanD88]
van Dam, A., “PHIGS + Functional Description, Revision 3.0,” Computer Graphics,
22
(3), July
1988, 125-218.
[WNDS99]
Woo, Mason, Neider, Jackie, Davis, Tom, and Shreiner, Dave,
OpenGL Programming Guide
,
3
rd
Edition, Addison Wesley Longman, 1999.
Wright, Richard S., Jr., and Sweet, Michael,
OPENGL SuperBible
, 2
nd
[WriS00]
Edition, Waite Group
Press, 2000.
Hodographs
[Faro92]
Farouki, Rida T., “Pythagorean-Hodograph Curves in Practical Use,” in [Barn92], 3-33.
[KimD93]
Kim, Deok-Soo, “Hodograph Approach to Geometric Characterization of Parametric Cubic
Curves,” CAD,
25
(10), October 1993, 644-654.
[Moon99]
Moon, Hwan Pyo, “Minkowski Pythagorean Hodographs,” CAGD,
16
(8), September 1999,
739-753.
[SaWS95]
Saito, Takafumi, Wang, Guo-Jin, and Sederberg, Thomas W., “Hodographs and Normals of
Rational Curves and Surfaces,” CAGD,
12
(4), June 1995, 417-430.
[SedW87]
Sederberg, T., and Wang, X., “Rational Hodographs,” CAGD,
4
(4), 1987, 333-335.
Implicit Curves and Surfaces
[AllG87]
Allgower, E.L., and Gnutzmann, S., “An Algorithm for Piecewise Linear Approximations of
an Implicitly Defined Two-Dimensional Surfaces,” SIAM J. Numerical Analysis,
24
(2), April
1987, 452-469.
[AllG91]
Allgower, E.L., and Gnutzmann, S., “Simplicial Pivoting for Mesh Generation of Implicitly
Defined Surfaces,” CAGD,
8
(4), October 1991, 305-325.
[AllS85]
Allgower, E.L., and Schmidt, P.H., “An Algorithm for Piecewise-Linear Approximations of an
Implicitly Defined Manifold,” SIAM J. Numerical Analysis,
22
(2), April 1985, 322-346.
[Bloo88]
Bloomenthal, Jules, “Polygonization of Implicit Surfaces,” CAGD,
5
(4), November 1988,
341-355.
[Bloo97]
Bloomenthal, Jules, editor,
Introduction to Implicit Surfaces
, Morgan Kaufmann Publ., 1997.
[Chan88]
Chandler, Richard E., “A Tracking Algorithm for Implicitly Defined Curves,” CG&A,
8
(2),
March 1988, 83-89.
[GarZ79]
Garcia, C.B., and Zangwill, W.I., “Finding All Solutions to Polynomial Systems and Other
Systems of Equations,” Math. Programming,
16
(1979), 159-176.
[GonN02]
Gonzalez-Vega, Laureano, and Necula, Ioana, “Efficient Topology Determination of Implic-
itly Defined Algebraic Plane Curves,” CAGD,
19
(9), December 2002, 719-743.
[Hoff93]
Hoffmann, Christoph M., “Implicit Curves and Surfaces in CAGD,” CG&A,
13
(1), Jan., 1993,
79-88.
[Morg83]
Morgan, A.P., “A Method for Computing All Solutions to Systems of Polynomial Equations,”
ACM Trans. on Math. Software,
9
(1983), 1-17.
[NinB93]
Ning, Paul, and Bloomenthal, Jules, “An Evaluation of Implicit Surface Tilers,” CG&A,
13
(4),
November 1993, 33-41.
[SeZZ89]
Sederberg, Thomas W., Zhao, Junwu, and Zundel, Alan K., “Approximate Parameterization
of Algebraic Curves,” in [StrS89], 33-54.
[VeVC94]
Verschelde, Jan, Verlinden, Pierre, and Cools, Ronald, “Homotopies Exploiting Polytopes for
Solving Sparse Polynomial Systems,” SIAM J. Numer. Anal.,
31
(3), June 1994, 915-930.
[Wats86]
Watson, Layne T., “Numerical Linear Algebra Aspects of Globally Convergent Homotopy
Methods,” SIAM Review,
28
(4), December 1986, 529-545.
[Wrig85]
Wright, A.H., “Finding All Solutions to a System of Polynomial Equations,” Math. of Com-
putation,
44
(1985), 125-133.
