Actual Morphing: A Physical-Based Approach for Blending Two 2D/3D Shapes
Abstract
When two topologically identical shapes are blended, various possible transformation paths exist from the source shape to the target shape. Which one is the most plausible? Here we propose that the transformation process should obey a quasi-physical law. This paper combines morphing with deformation theory from continuum mechanics. By using strain energy, which reflects the magnitude of deformation, as an objective function, we convert the problem of path interpolation into an unconstrained optimization problem. To reduce the number of variables in the optimization we adopt shape functions, as used in the finite element method (FEM). A point-to-point correspondence between the source and target shapes is naturally established using these polynomial functions plus a distance map.
BibTeX
@inproceedings {10.2312:sm.20041407,
booktitle = {Solid Modeling},
editor = {Gershon Elber and Nicholas Patrikalakis and Pere Brunet},
title = {{Actual Morphing: A Physical-Based Approach for Blending Two 2D/3D Shapes}},
author = {Hu, S. M. and Li, C. F. and Zhang, H.},
year = {2004},
publisher = {The Eurographics Association},
ISSN = {1811-7783},
ISBN = {3-905673-55-X},
DOI = {10.2312/sm.20041407}
}
booktitle = {Solid Modeling},
editor = {Gershon Elber and Nicholas Patrikalakis and Pere Brunet},
title = {{Actual Morphing: A Physical-Based Approach for Blending Two 2D/3D Shapes}},
author = {Hu, S. M. and Li, C. F. and Zhang, H.},
year = {2004},
publisher = {The Eurographics Association},
ISSN = {1811-7783},
ISBN = {3-905673-55-X},
DOI = {10.2312/sm.20041407}
}