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Pré-Publication, Document De Travail Année : 2014

The discontinuity issue of total orders on metric spaces and its consequences for mathematical morphology

Emmanuel Chevallier
  • Fonction : Auteur
  • PersonId : 952014
Jesus Angulo

Résumé

We address here the problem of discontinuities of total orders in a metric space and its implications for mathematical morphology. We first give a rigorous formulation of the problem. Then, a new approach is proposed to tackle the discontinuity issue by adapting the order to the image to be processed. Given an image and a total order we define a cost that evaluates the importance of the discontinuities for morphological processing. The proposed order is then built as a minimization of this cost function. One of the strength of the proposed framework is its generality: the only ingredient required to build the total order is the graph of distances between values of the image. The adapted order can be computed for any image valued in a metric space where the distance is explicitly known. We present results for color images, diffusion tensor images (DTI) and images valued in the hyperbolic upper half-plane.
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Dates et versions

hal-00948232 , version 1 (17-02-2014)
hal-00948232 , version 2 (19-03-2014)
hal-00948232 , version 3 (15-01-2015)

Identifiants

  • HAL Id : hal-00948232 , version 3

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Emmanuel Chevallier, Jesus Angulo. The discontinuity issue of total orders on metric spaces and its consequences for mathematical morphology. 2014. ⟨hal-00948232v3⟩
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