A binary three-dimensional (3D) image II is well-composed if the boundary surface of its continuous analog is a 2D manifold. In this paper, we present a method to locally “repair” the cubical complex Q(I)Q(I) (embedded in R3R3) associated to II to obtain a polyhedral complex P(I)P(I) homotopy equivalent to Q(I)Q(I) such that the boundary surface of P(I)P(I) is a 2D manifold (and, hence, P(I)P(I) is a well-composed polyhedral complex). For this aim, we develop a new codification system for a complex KK, called ExtendedCubeMap (ECM) representation of KK, that codifies: (1) the information of the cells of KK (including geometric information), under the form of a 3D grayscale image gPgP; and (2) the boundary face relations between the cells of ...
AbstractWe prove the following theorem: A polyhedral embedding of a 2-dimensional cell complex in S3...
In this paper we present an algorithm for parameterizing arbitrary surfaces onto a quadrilateral dom...
A simple cell complex C in Euclidean d-space Ed is a covering of Ed by finitely many convex j-dimens...
We build upon the work developed in [4] in which we presented a method to “locally repair” the cubi...
A 3D binary image I can be naturally represented by a combinatorial-algebraic structure called cubi...
Well-composed 3D digital images, which are 3D binary digital images whose boundary surface is made u...
In previous work we proposed a combinatorial algorithm to \locally repair" the cubical complex Q(I)...
A 3D binary image I is called well-composed if the set of points in the topological boundary of the ...
Let I be a 3D digital image, and let Q(I) be the associated cubical complex. In this paper we show h...
Let \(I=(\mathbb {Z}^3,26,6,B)\) be a three-dimensional (3D) digital image, let \(Q(I)\) be an assoc...
Let I=(Z3,26,6,B) be a 3D digital image, let Q(I) be the associated cubical complex and let ∂Q(I) be...
A 3D image I is well-composed if it does not contain critical edges or vertices (where the boundary ...
Cohomology groups and the cohomology ring of three-dimensional (3D) objects are topological invarian...
A 3D binary digital image is said to be well-composed if and only if the set of points in the faces ...
For well-composed (manifold) objects in the 3D cubical grid, the Euler characteristic is equal to ha...
AbstractWe prove the following theorem: A polyhedral embedding of a 2-dimensional cell complex in S3...
In this paper we present an algorithm for parameterizing arbitrary surfaces onto a quadrilateral dom...
A simple cell complex C in Euclidean d-space Ed is a covering of Ed by finitely many convex j-dimens...
We build upon the work developed in [4] in which we presented a method to “locally repair” the cubi...
A 3D binary image I can be naturally represented by a combinatorial-algebraic structure called cubi...
Well-composed 3D digital images, which are 3D binary digital images whose boundary surface is made u...
In previous work we proposed a combinatorial algorithm to \locally repair" the cubical complex Q(I)...
A 3D binary image I is called well-composed if the set of points in the topological boundary of the ...
Let I be a 3D digital image, and let Q(I) be the associated cubical complex. In this paper we show h...
Let \(I=(\mathbb {Z}^3,26,6,B)\) be a three-dimensional (3D) digital image, let \(Q(I)\) be an assoc...
Let I=(Z3,26,6,B) be a 3D digital image, let Q(I) be the associated cubical complex and let ∂Q(I) be...
A 3D image I is well-composed if it does not contain critical edges or vertices (where the boundary ...
Cohomology groups and the cohomology ring of three-dimensional (3D) objects are topological invarian...
A 3D binary digital image is said to be well-composed if and only if the set of points in the faces ...
For well-composed (manifold) objects in the 3D cubical grid, the Euler characteristic is equal to ha...
AbstractWe prove the following theorem: A polyhedral embedding of a 2-dimensional cell complex in S3...
In this paper we present an algorithm for parameterizing arbitrary surfaces onto a quadrilateral dom...
A simple cell complex C in Euclidean d-space Ed is a covering of Ed by finitely many convex j-dimens...