An approximation for normal vectors of deformable models

Author

Ting, Wu Shin ; de Melo, Vanio Fragoso

Author_Institution

Dept. of Ind. Autom. & Comput. Eng., State Univ. of Campinas, Brazil

fYear

2003

fDate

12-15 Oct. 2003

Firstpage

3

Lastpage

10

Abstract

A physically-based deformable model proposed by Terzopoulous et al. is governed by the Lagrange´s form, that establishes the relation between the dynamics of deformable models under the influence of applied forces. The net instantaneous potential energy of deformation is derived on the basis of the geometric properties, namely the first and second fundamental forms. For simplicity, the normal vector at each sample point is approximated by the second derivative. We present another approximation for the normal vector which offers better visual simulation. Some comparisons are given.

Keywords

approximation theory; deformation; differential geometry; digital simulation; force; partial differential equations; solid modelling; tensors; vectors; Lagrange form; first fundamental form; geometric properties; normal vector approximation; physically-based deformable model; potential energy; second fundamental form; visual simulation; Automation; Computer industry; Deformable models; Differential equations; Lagrangian functions; Mathematics; Partial differential equations; Surface resistance; Tensile stress; Vectors;

fLanguage

English

Publisher

ieee

Conference_Titel

Computer Graphics and Image Processing, 2003. SIBGRAPI 2003. XVI Brazilian Symposium on

ISSN

1530-1834

Print_ISBN

0-7695-2032-4

Type

conf

DOI

10.1109/SIBGRA.2003.1240985

Filename

1240985