Generalized Simple Surface Points

By using exclusively the customary adjacency relations on ℤ3, we generalize the notion of a simple surface point given by Morgenthaler in the 80s. A new definition of simple surface arises, and we show that simple surfaces coincide with the strong separating family of a certain class of digital surfaces defined by means of continuous analogues that, in turn, contains several families of discrete surfaces in the literature.

[1]  Eladio Domínguez,et al.  Universal Spaces for (k, k̅)-Surfaces , 2009, DGCI.

[2]  Azriel Rosenfeld,et al.  Surfaces in Three-Dimensional Digital Images , 1981, Inf. Control..

[3]  Eladio Domínguez,et al.  Separation Theorems for Simplicity 26-Surfaces , 2002, DGCI.

[4]  A. W. Roscoe,et al.  Continuous analogs of axiomatized digital surfaces , 1984, Comput. Vis. Graph. Image Process..

[5]  Gilles Bertrand,et al.  Some Topological Properties of Surfaces in Z3 , 2004, Journal of Mathematical Imaging and Vision.

[6]  Rafael Ayala,et al.  Weak lighting functions and strong 26-surfaces , 2002, Theor. Comput. Sci..

[7]  Eladio Domínguez,et al.  A plate-based definition of discrete surfaces , 2012, Pattern Recognit. Lett..

[8]  Gilles Bertrand,et al.  Simplicity surfaces: a new definition of surfaces in Z3 , 1998, Optics & Photonics.