“Dynamic deformation of solid primitives with constraints” by Metaxas and Terzopoulos

  • ©Dimitris Metaxas and Demetri Terzopoulos




    Dynamic deformation of solid primitives with constraints



    No abstract available.


    1. Barr, A., (1981) “Superquadrica and angle preserving transformations,” IEEE Computer Graphics and Applications, 1(1), 11- 23.]]
    2. Barr, A., (1984) “Global and local deformations of solid primitives,” Computer Graphics, 18(3), 21-30.]]
    3. Bar~el, R., and Barr, A., (1988) “A modeling system based on dynamic constraints,” Computer Graphics, 22(4), 179-188.]]
    4. Baumgarte, J., (1972) “Stabilization of constraints and integrals of motion in dynamical systems,” Comp. Meth. in Appi. Mech. and Eng., 1, 1-16.]]
    5. Hoffmann, C.M., (1989) Geometric and solid modeling, Morgan- Kaufmann, Polo Alto.]]
    6. Kardestuncer, H.,York–(ed’.)’ (1987) Finite element handbook, McGraw-Hill, New]]
    7. Metaxas, D., and Terzopoulos, D., (1992) “Shape and nonrigid motion estimation from synthesis.” IEEE Transactions on Pattern Analysis and Machsne Intelligence, to appear.]]
    8. Pentland,A., and Williams, J., (1989) “Good vibrations: Modal dynamics forgraphics and an,mation,” Computer Graphics, 2a(3), 21s-222]]
    9. Plait, J., (1989) “Constraint methods for neural networks and computer graphics,” PhD Thesis, Dept. of Computer Science, California Institute of Technology, Pasadena, CA (Caltech-CS- T1~89-07).]]
    10. Sclaroff, S., and Pentland, A., (1991) “Generalized implicit functions for computer graphics,” Computer Graphics, 25(4), 247- 250.]]
    11. Shabana, A., (1989) Dynamics of multibody systems, Wiley, New York.]]
    12. Sederberg, T.W., and Parry, S.R., (1989) “Free-form deformation of solid geometric primitives,” Computer Graphics, 20(4), 151- 160.]]
    13. Terzopoulos, D., and Metaxas, D., (1991) “Dynamic 3D models with local and global deformations: Deformable superquadrics.” IEEE Transactions on Pattern Analysis and Machine Intelligence, 13(7), 703-713.]]
    14. Terzopoulos, D., and Fleischer, K., (1988) “Deformable models,” The Visual Computer, 4(6), 306-331.]]
    15. Terzopoulos. D., and Witkin A. (1988) “Physically-based roodels with rigid and deformal~ie. ~omponents,’ IEI~E Computer Graphics and Applications, 8(6), 41-51.]]
    16. Witkin, A., and Welch, W., (1990) “Fast animation and control of nonrigid structures,” Computer Graphics, 24(3), 243-252.]]
    17. Witkin, A., Fleischer, K., and Barr, A., (1987) “Energy constraints on parameterized models,” Computer Graphics, 21(4), 225-232.]]
    18. Wittenburg, J., (1977) Dynamics of systems of rigid bodies, Tubner, Stuttgart.]]

ACM Digital Library Publication:

Overview Page: