Well-composedness in Alexandrov spaces implies digital well-composedness in Z^n

Abstract : In digital topology, it is well-known that, in 2D and in 3D, a digital set X ⊆ Z n is digitally well-composed (DWC), i.e., does not contain any critical configuration, if its immersion in the Khalimsky grids H n is well-composed in the sense of Alexandrov (AWC), i.e., its boundary is a disjoint union of discrete (n − 1)-surfaces. We show that this is still true in n-D, n ≥ 2, which is of prime importance since today 4D signals are more and more frequent.
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Nicolas Boutry, Laurent Najman, Thierry Géraud. Well-composedness in Alexandrov spaces implies digital well-composedness in Z^n. 20th IAPR International Conference on Discrete Geometry for Computer Imagery (DGCI), Sep 2017, Vienna, Austria. ⟨hal-01744455⟩

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