Computer graphics and the geometry of S3

1. T. Banchoff (1978) “Computer animation and geometry of surfaces in 3- and 4-space,”Proceedings of the International Congress of Mathematicians, 1005–1013.

2. S. Feiner, D. Salesin, and T. Banchoff (1982) “DIAL: A diagrammatic animation language,”IEEE Computer Graphics and Applications, 2(7):43–56.

   Article  Google Scholar 

3. H. Gluck, F. Warner, and W. Ziller (1986) “The geometry of the Hopf fibrations,”L’enseignement Mathématique, to appear.

4. M. Hénon and C. Heiles (1964) “The applicability of the third integral of motion: some numerical experiments,”Astron. J., 69:73–79.

   Article  Google Scholar 

5. D. Hoffman and W. Meeks (1985) “A complete imbedded minimal surface inR ³ with genus one and three ends,”Journal of Differential Geometry, 21:109–127.

   MATH  MathSciNet  Google Scholar 

6. H. Hopf (1931) “Über die Abbildungen der dreidimensionalen Sphare auf die Kugelflashe,”Math. Ann., 104:637–665.

   Article  MathSciNet  Google Scholar 

7. H. Koçak (1986)Differential and Difference Equations through Computer Experiments—with diskettes containing PHASER: An animator/simulator for dynamical systems for IBM personal computers, Springer-Verlag.

8. H. Koçak, F. Bisshopp, T. Banchoff, and D. Laidlaw (1986) “Topology and mechanics with computer graphics: Linear Hamiltonian systems in four dimensions,”Adv. Appl. Math., to appear.

9. E. Lorenz (1963) “Deterministic non-periodic flow,”J. Atmos. Sci., 29:130–141.

   Article  Google Scholar 

10. H. O. Peitken and P. H. Richter (1986)The Beauty of Fractals: Images of complex dynamical systems, Springer-Verlag.

11. H. O. Peitken, D. Saupe, and F. v. Haeseler (1984) “Cayleys’ problem and Julia sets,”The Mathematical Intelligencer, 6(2):11–21.

    Article  MathSciNet  Google Scholar 

12. R. Penrose (1978) “The geometry of the universe,” inMathematics Today, Edited by L. A. Steen, Springer-Verlag.

13. U. Pinkall (1985) “Hopf tori in S³,”Invent. Math., 81:379–386.

    Article  MATH  MathSciNet  Google Scholar 

14. Science Digest, January 1984 and April 1986.

15. H. Seifert and W. Threlfall (1980)A Textbook of Topology, Academic Press.

16. N. Steenrod (1951)Topology of Fiber Bundles, Princeton University Press.

17. P. R. Stein and S. M. Ulam (1964) “Nonlinear transformation studies on electronic computers,”Rozprawy Ma-tematyczny, 39:1–66.

    MathSciNet  Google Scholar 

18. W. P. Thurston and J. R. Weeks (1984) “The mathematics of three-dimensional manifolds,”Scientific American, 251(l):108–121.

    Article  Google Scholar 

Download references