Graphics Reference
In-Depth Information
[Duff79]
Duff, T., “Smoothly Shaded Renderings of Polyhedral Objects on Raster displays,” SIGGRAPH
79,
13
(2), August 1979, 270-275.
[GoTG84]
Goral, C., Torrance, K.E., and Greenberg, D.P., “Modeling the Interaction of Light Between
Diffuse Surfaces,” SIGGRAPH 84,
18
(3), July 1984, 212-222.
[Gour71]
Gouraud, H., “Continuous Shading of Curved Surfaces,” IEEE Trans. on Computers,
C-20
(6),
June 1971, 623-629. Also in [Free80], 302-308.
[TorS67]
Torrance, K.E., and Sparrow, E.M., “Theory for Off-Specular Reflection from Roughened
Surfaces,” J. of the Optical Society of America,
56
(7), September 1967, 1105-1114.
[Whit80]
Whitted, T., “An Improved Illumination Model for Shaded Display,” CACM,
23
(6), June 1980,
343-349. Also in [JGMH88], 132-138.
[Will78]
Williams, L., “Casting Curved Shadows on Curved Surfaces,” SIGGRAPH 78,
12
(3), August
1978, 270-274.
[WoPF90]
Woo, Andrew, Poulin, Pierre, and Fournier, Alain, “A Survey of Shadow Algorithms,” CG&A,
10
(6), November 1990, 13-32.
Spatial Data Structures
[DocT81]
Doctor, L., and Torborg, J., “Display Techniques for Octree-Encoded Objects,” CG&A,
1
(3),
29-38.
[Meag82a]
Meagher, D., “Geometric Modeling Using Octree Encoding,” CGIP,
19
(2), June 1982, 129-147.
[Meag82b]
Meagher, D., “Efficient Synthetic Image Generation of Arbitrary 3-D Objects,” in Proc. of th
EEE Computer Society Conference on Pattern Recognition and Image Processing, IEEE
Computer Society Press, 1982.
[Same84]
Samet, Hanan, “The Quadtree and Related Hierarchical Data Structures,” ACM Computing
Surveys,
16
(2), June 1984, 187-260.
[Same90a]
Samet, Hanan,
Design and Analysis of Spatial Data Structures
, Addison-Wesley Publ. Co., 1990.
[Same90b]
Samet, Hanan,
Applications of Spatial Data Structures: Computer Graphics, Image Processing,
and GIS
, Addison-Wesley Publ. Co., 1990.
[SamW88]
Samet, Hanan, and Webber, Robert E., “Hierarchical Data Structures and Algorithms for
Computer Graphics: Part I: Fundamentals,” CG&A,
8
(3), 1988, 48-68.
[YKFT84]
Yamaguchi, K., Kunii, T.L., Fujimura, K., and Toriya, H., “Octree Related Data Structures and
Algorithms,” CG&A,
4
(1), 1984, 53-59.
Splines
[BarG89]
Barry, P.J., and Goldman, R.N., “What Is the Natural Generalization of a Bézier Curve?,” in
[LycS89], 71-86.
[BaDD87]
Barsky, B.A., DeRose, T.D., and Dippe, M.D., “An Adaptive Subdivision Method with Crack
Prevention for Rendering Beta-spline Objects,” Univ. of California, Berkeley, Computer
Science Division, Technical Report UCB/CSD 87/348, 1987.
[Bars88]
Barsky, Brian A.,
Computer Graphics and Geometric Modeling Using Beta-splines
,
Springer-Verlag, 1988.
[BarD89]
Barsky, Brian A., and DeRose, Tony D., “Geometric Continuity of Parametric Curves: Three
Equivalent Characterizations,” CG&A,
9
(6), November 1989, 60-68.
[BarD90]
Barsky, Brian A., and DeRose, Tony D., “Geometric Continuity of Parametric Curves:
Construction of Geometrically Continuous Splines, CG&A,
10
(1), January 1990, 60-68.
[BaBB87]
Bartels, Richard H., Beatty, John C., and Barsky, Brian A.,
An Introduction to Splines for Use
in Computer Graphics and Geometric Modeling
, Morgan Kaufmann Publishers, 1987.
[Bézi74]
Bézier, P., “Mathematical and Practical Possibilities of UNISURF,” in [BarR74], 127-152.
[Blin89a]
Blinn, James F., “How many different cubic curves are there?,” CG&A,
9
(3), May 1989, 78-83.
[Blin89b]
Blinn, James F., “Cubic curve update,” CG&A,
9
(6), November 1989, 70-73.
[Blin99]
Blinn, James F., “How many rational parametric cubic curves are there? Part 1: Inflection
points,” CG&A,
19
(4), July/August 1999, 84-87.
[Blin00a]
Blinn, James F., “How many different parametric cubic curves are there? Part 2: The same
game,” CG&A,
19
(6), November/December 1999, 88-92. Correction in CG&A,
20
(1),
JanuaryFebruary 2000, 69.
[Blin00b]
Blinn, James F., “How many rational parametric cubic curves are there? Part 3: The Catalog,”
CG&A,
20
(2), March/April 2000, 85-88.
