Digital and cellular convexity

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We introduce a new definition of cellular convexity on square mosaics. We also define digital convexity for 4-connected sets of points on a square lattice. Using these definitions we show that a cellular complex is cellularly convex if and only if the digital region determined by the complex is digitally convex. We also show that a digital region is digitally convex if and only if the minimum-perimeter polygon (MPP) enclosing the digital region contains only the digital region. This result is related to a property of the MPP of the half-cell expansion of the complex determined by the digital region.

论文关键词:Cellular convexity,Digital convexity,Half-cell expansion,Minimum-perimeter polygon,Concavity,Shape,Blob

论文评审过程:Received 8 January 1981, Revised 1 October 1981, Accepted 24 November 1981, Available online 19 May 2003.

论文官网地址:https://doi.org/10.1016/0031-3203(82)90038-3