
doi: 10.1007/11774938_19
handle: 11570/1900704
Dimension is a fundamental concept in topology. Mylopoulos and Pavlidis [17] provided a definition for discrete spaces. In the present paper we propose an alternative one for the case of planar digital objects. It makes up certain shortcomings of the definition from [17] and implies dimensionality properties analogous to those familiar from classical topology. We also establish relations between dimension of digital objects and their Euler characteristic.
digital topology, 2D binary object, dimension
digital topology, 2D binary object, dimension
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