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ICCV
2003
IEEE
2003
IEEE
The Local Projective Shape of Smooth Surfaces and their Outlines
This article examines projectively-invariant local geometric properties of smooth curves and surfaces. Oriented projective differential geometry is proposed as a general framework for establishing such invariants and characterizing the local projective shape of surfaces and their outlines. It is applied to two problems: (1) the projective generalization of Koenderink's famous characterization of convexities, concavities, and inflections of the apparent contours of solids bounded by smooth surfaces, and (2) the image-based construction of rim meshes, which provide a combinatorial description of the arrangement induced on the surface of an object by the contour generators associated with multiple cameras observing it.
Real-time TrafficComputer Vision | ICCV 2003 | Local Geometric Properties | Local Projective Shape | Projective Generalization | Smooth Curves | Smooth Surfaces |
| Added | 15 Oct 2009 |
| Updated | 31 Oct 2009 |
| Type | Conference |
| Year | 2003 |
| Where | ICCV |
| Authors | Svetlana Lazebnik, Jean Ponce |
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