Digital planarity—A review |
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Authors: | Valentin Brimkov David Coeurjolly |
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Affiliation: | a Mathematics Department, SUNY Buffalo State College, Buffalo, NY 14222, USA b LIRIS, CNRS UMR 5205, Université Claude Bernard Lyon 1, F-69622 Villeurbanne, France c Computer Science Department, The University of Auckland, New Zealand |
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Abstract: | Digital planarity is defined by digitizing Euclidean planes in the three-dimensional digital space of voxels; voxels are given either in the grid-point or the grid-cube model. The paper summarizes results (also including most of the proofs) about different aspects of digital planarity, such as supporting or separating Euclidean planes, characterizations in arithmetic geometry, periodicity, connectivity, and algorithmic solutions. The paper provides a uniform presentation, which further extends and details a recent book chapter in [R. Klette, A. Rosenfeld, Digital Geometry—Geometric Methods for Digital Picture Analysis, Morgan Kaufmann, San Francisco, 2004]. |
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Keywords: | 52C99 62H35 65D18 68U05 |
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