Cagliari, Francesca ; Ferri, Massimo ; Gualandri, Luciano ; Landi, Claudia
(2012)
Persistence modules, shape description, and completeness.
Springer LNCS, 7309
.
pp. 148-156.
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Abstract
Persistence modules are algebraic constructs that can be used to describe the shape of an object starting from a geometric representation of it. As shape descriptors, persistence modules are not complete, that is they may not distinguish non-equivalent shapes.
In this paper we show that one reason for this is that homomorphisms between persistence modules forget the geometric nature of the problem. Therefore we introduce geometric homomorphisms between persistence modules, and show that in some cases they perform better. A combinatorial structure, the $H_0$-tree, is shown to be an invariant for geometric isomorphism classes in the case of persistence modules obtained through the 0th persistent homology functor.
Abstract
Persistence modules are algebraic constructs that can be used to describe the shape of an object starting from a geometric representation of it. As shape descriptors, persistence modules are not complete, that is they may not distinguish non-equivalent shapes.
In this paper we show that one reason for this is that homomorphisms between persistence modules forget the geometric nature of the problem. Therefore we introduce geometric homomorphisms between persistence modules, and show that in some cases they perform better. A combinatorial structure, the $H_0$-tree, is shown to be an invariant for geometric isomorphism classes in the case of persistence modules obtained through the 0th persistent homology functor.
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Article
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Keywords
geometric homomorphism; rank invariant; $H_0$-tree
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DOI
Deposit date
28 Jul 2015 12:33
Last modified
28 Jul 2015 12:33
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Document type
Article
Creators
Keywords
geometric homomorphism; rank invariant; $H_0$-tree
Subjects
DOI
Deposit date
28 Jul 2015 12:33
Last modified
28 Jul 2015 12:33
URI
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