Three-dimensional thinning algorithm using subfields

Abstract

A three-dimensional parallel thinning algorithm is presented. This algorithm works in cubic grid with the 26-connectivity. It is based upon two topological numbers introduced elsewhere. These numbers allow us to check if a point is simple or not and to detect end points. The strategy which is used for removing points in parallel without altering the topology of the image is a strategy based upon subfields: the cubic grid is divided into 8 subfields which are successively activated. The use of 4 subfields is also considered. One major interest of the subfield approach is that it is `complete,' i.e., all simple points which are not considered as skeletal points are removed. The proposed algorithm allows us to get a curve skeleton, a surface skeleton as well as a topological kernel of the objects. Furthermore it is possible to implement it by using only Boolean conditions.