Cups Products in Z2-Cohomology of 3D Polyhedral Complexes

Abstract

Let I=(Z3,26,6,B) be a 3D digital image, let Q(I) be the associated cubical complex and let ∂ Q(I) be the subcomplex of Q(I) whose maximal cells are the quadrangles of Q(I) shared by a voxel of B in the foreground -- the object under study -- and by a voxel of Z3 B in the background -- the ambient space. We show how to simplify the combinatorial structure of ∂ Q(I) and obtain a 3D polyhedral complex P(I) homeomorphic to ∂ Q(I) but with fewer cells. We introduce an algorithm that computes cup products on H*(P(I);Z2) directly from the combinatorics. The computational method introduced here can be effectively applied to any polyhedral complex embedded in R3.