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http://hdl.handle.net/10553/46204
Título: | Geometric invariant shape representations using morphological multiscale analysis | Autores/as: | Alvarez, L Blanc, A. P. Mazorra, L. Santana, F. |
Clasificación UNESCO: | 120601 Construcción de algoritmos 120602 Ecuaciones diferenciales 120326 Simulación 220990 Tratamiento digital. Imágenes |
Palabras clave: | Affine invariance Geometric partial differential equations Mathematical morphology Shape representation |
Fecha de publicación: | 2003 | Publicación seriada: | Journal of Mathematical Imaging and Vision | Resumen: | In this paper, we present a new geometric invariant shape representation using morphological multiscale analysis. The geometric invariant is based on the area and perimeter evolution of the shape under the action of a morphological multiscale analysis. First, we present some theoretical results on the perimeter and area evolution across the scales of a shape. In the case of similarity transformations, the proposed geometric invariant is based on a scale-normalized evolution of the isoperimetric ratio of the shape. In the case of general affine geometric transformations the proposed geometric invariant is based on a scale-normalized evolution of the area. We present some numerical experiments to evaluate the performance of the proposed models. We present an application of this technique to the problem of shape classification on a real shape database and we study the well-posedness of the proposed models in the framework of viscosity solution theory. | URI: | http://hdl.handle.net/10553/46204 | ISSN: | 0924-9907 | DOI: | 10.1023/A:1022112501107 | Fuente: | Journal of Mathematical Imaging and Vision [ISSN 0924-9907], v. 18 (2), p. 145-168 |
Colección: | Artículos |
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