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Intrinsic Scale Space for Images on Surfaces: The Geodesic Curvature Flow

✍ Scribed by Ron Kimmel

Publisher
Elsevier Science
Year
1997
Tongue
English
Weight
892 KB
Volume
59
Category
Article
ISSN
1077-3169

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✦ Synopsis

geodesic curvature flow, the embedding property is preserved and the evolving curve exists for all times and either A scale space for images painted on surfaces is introduced. Based on the geodesic curvature flow of the iso-gray level conbecomes a geodesic or shrinks into a point. We will limit tours of an image painted on the given surface, the image our discussion to smooth Riemannian surfaces which are is evolved and forms the natural geometric scale space. Its convex at infinity (the convex hull of every compact subset geometrical properties are discussed as well as the intrinsic is compact). Moreover, we shall deal only with surfaces nature of the proposed flow; i.e., the flow is invariant to the which are given as a parameterized function in a bounded bending of the surface.

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