Samenvatting
In this paper the notion of hyperconnectivity, which is an extension of connectivity is explored in the lattice theoretical framework. It is shown that a fourth axiom is needed when moving from connections to hyperconnections, in order to define hyperconnected components meaningfully, which is important for the definition of, e.g., viscous levellings. New hyperconnectivity openings, which are the hyperconnected equivalents of connectivity openings are then defined. It then shown that all algebraic openings which are translation and grey-scale invariant can be described as hyperconnected attribute filters. This means that hyperconnectivity lies at the heart of a vast range of morphological filters.
Originele taal-2 | English |
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Titel | Mathematical Morphology and Its Applications to Image and Signal Processing |
Subtitel | 10th International Symposium, ISMM 2011, Verbania-Intra, Italy, July 6-8, 2011, Proceedings |
Redacteuren | Pierre Soille, Martino Pesaresi, Georgios Ouzounis |
Uitgeverij | Springer |
Pagina's | 73-84 |
Aantal pagina's | 12 |
ISBN van elektronische versie | 9783642215698 |
ISBN van geprinte versie | 9783642215681 |
DOI's | |
Status | Published - 2011 |
Publicatie series
Naam | Lecture Notes in Computer Science book series |
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Uitgeverij | Springer |
Volume | 6671 |