论文信息 - The Digital Topology of Sets of Convex Voxels

The Digital Topology of Sets of Convex Voxels

Classical digital geometry deals with sets of cubical voxels (or square pixels) that can share faces, edges, or vertices, but basic parts of digital geometry can be generalized to sets S of convex voxels (or pixels) that can have arbitrary intersections. In particular, it can be shown that if each voxel P of S has only finitely many neighbors (voxels of S that intersect P), and if any nonempty intersection of neighbors of P intersects P, then the neighborhood N(P) of every voxel P is simply connected and without cavities, and if the topology of N(P) does not change when P is deleted (i.e., P is a “simple” voxel), then deletion of P does not change the topology of S.

Azriel Rosenfeld | Punam K. Saha

[1] 日本数学会,et al. Encyclopedic dictionary of mathematics , 1993 .

[2] Azriel Rosenfeld,et al. Determining simplicity and computing topological change in strongly normal partial tilings of R2 or R3 , 2000, Pattern Recognit..

[3] Azriel Rosenfeld,et al. Digital Geometry: Introduction and Bibliography , 1997 .

[4] Jack Sklansky,et al. Recognition of convex blobs , 1970, Pattern Recognit..

[5] Azriel Rosenfeld,et al. Strongly normal sets of convex polygons or polyhedra , 1998, Pattern Recognit. Lett..

[6] Gabor T. Herman,et al. Geometry of digital spaces , 1998, Optics & Photonics.

[7] Azriel Rosenfeld,et al. Local Topological Parameters in a Tetrahedral Representation , 1998, Graph. Model. Image Process..

[8] Prabir Bhattacharya,et al. Digital Connectivity and Extended Well-Composed Sets for Gray Images , 1997, Comput. Vis. Image Underst..