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CORR
2008
Springer

Natural pseudo-distance and optimal matching between reduced size functions

14 years 18 days ago
Natural pseudo-distance and optimal matching between reduced size functions
We study a dissimilarity measure between shapes, expressed by the natural pseudodistance between size pairs, where a shape is viewed as a topological space endowed with a real-valued continuous function. Measuring dissimilarity amounts to minimizing the change in the functions due to the application of homeomorphisms between topological spaces, with respect to the L-norm. A new class of shape descriptors, called reduced size functions, is introduced. They are obtained by slightly modifying the classical concept of size function. We show that reduced size functions can be compared by solving an optimal matching problem between countable point sets. In this way we obtain a distance between reduced size functions that is shown to be stable. This allows us to provide a new lower bound for the dissimilarity measure between shapes. Key words: Shape comparison, shape representation, reduced size function, natural pseudo-distance 2000 MSC: Primary: 68T10, 58C05; Secondary: 49Q10
Michele d'Amico, Patrizio Frosini, Claudia Landi
Added 09 Dec 2010
Updated 09 Dec 2010
Type Journal
Year 2008
Where CORR
Authors Michele d'Amico, Patrizio Frosini, Claudia Landi
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