http://www.cnr.it/ontology/cnr/individuo/prodotto/ID31329
Describing shapes by geometrical-topological properties of real functions (Articolo in rivista)
- Type
- Label
- Describing shapes by geometrical-topological properties of real functions (Articolo in rivista) (literal)
- Anno
- 2008-01-01T00:00:00+01:00 (literal)
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#doi
- 10.1145/1391729.1391731 (literal)
- Alternative label
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#autori
- Biasotti S.; De Floriani L.; Falcidieno B.; Frosini P.; Giorgi D.; Landi C.; Papaleo L.; Spagnuolo M. (literal)
- Pagina inizio
- Pagina fine
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#numeroVolume
- Rivista
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- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#numeroFascicolo
- Note
- ISI Web of Science (WOS) (literal)
- Scopu (literal)
- Http://www.cnr.it/ontology/cnr/pubblicazioni.owl#affiliazioni
- IMATI-CNR, Genoa, Italy
University of Genoa, Genoa, Italy
University of Bologna, Bologna, Italy
University of Modena and Reggio Emilia, Reggio Emilia, Italy (literal)
- Titolo
- Describing shapes by geometrical-topological properties of real functions (literal)
- Abstract
- Differential topology, and specifically Morse theory, provide a suitable setting for formalizing and solving
several problems related to shape analysis. The fundamental idea behind Morse theory is that of combining
the topological exploration of a shape with quantitative measurement of geometrical properties provided
by a real function defined on the shape. The added value of approaches based on Morse theory is in the
possibility of adopting different functions as shape descriptors according to the properties and invariants
that one wishes to analyze. In this sense,Morse theory allows one to construct a general framework for shape
characterization, parametrized with respect to the mapping function used, and possibly the space associated
with the shape. The mapping function plays the role of a lens through which we look at the properties of the
shape, and different functions provide different insights.
In the last decade, an increasing number of methods that are rooted in Morse theory and make use of
properties of real-valued functions for describing shapes have been proposed in the literature. The methods
proposed range from approaches which use the configuration of contours for encoding topographic surfaces
to more recent work on size theory and persistent homology. All these have been developed over the years
with a specific target domain and it is not trivial to systematize this work and understand the links, similarities,
and differences among the different methods. Moreover, different terms have been used to denote
the same mathematical constructs, which often overwhelm the understanding of the underlying common
framework.
The aim of this survey is to provide a clear vision of what has been developed so far, focusing on methods
that make use of theoretical frameworks that are developed for classes of real functions rather than for a
single function, even if they are applied in a restricted manner. The term geometrical-topological used in
the title is meant to underline that both levels of information content are relevant for the applications of
shape descriptions: geometrical, or metrical, properties and attributes are crucial for characterizing specific
instances of features, while topological properties are necessary to abstract and classify shapes according
to invariant aspects of their geometry. The approaches surveyed will be discussed in detail, with respect to
theory, computation, and application. Several properties of the shape descriptors will be analyzed and compared.
We believe this is a crucial step to exploit fully the potential of such approaches in many applications,
as well as to identify important areas of future research. (literal)
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