In this paper, we provide a graph-based representation of the homology (information related to the different “holes” the object has) of a binary digital volume. We analyze the digital volume AT-model representation [8] from this point of view and the cellular version of the AT-model [5] is precisely described here as three forests (connectivity forests), from which, for instance, we can straightforwardly determine representative curves of “tunnels” and “holes”, classify cycles in the complex, computing higher (co)homology operations,... Depending of the order in which we gradually construct these trees, tools so important in Computer Vision and Digital Image Processing as Reeb graphs and topological skeletons appear as results of pruning th...
This paper analyses the topological information of a digital object O under a combined combinatorial...
Homology theory formalizes the concept of hole in a space. For a given subset of the Euclidean space...
A 2D topology-based digital image processing framework is presented here. This framework consists of...
Homological characteristics of digital objects can be obtained in a straightforward manner computing...
In [4], given a binary 26-adjacency voxel-based digital volume V, the homological information (that ...
Given a 3D binary voxel-based digital object V, an algorithm for computing homological information f...
We introduce here a new F2 homology computation algorithm based on a generalization of the spanning ...
The homology of binary 3–dimensional digital images (digital volumes) provides concise algebraic des...
Given an 80-adjacency doxel-based digital four-dimensional hypervolume V, we construct here an assoc...
The paper analyzes the connectivity information (more precisely, numbers of tunnels and their homolo...
We present here a topo–geometrical description of a subdivided nD object called homological spanning...
Segmentations of a digital object based on a connectivity criterion at n-xel or sub-n-xel level are...
Computing and representing topological information form an important part in many applications such...
The goal of this paper is to construct an algebraic-topological representation of a 80–adjacent doxe...
In this paper we design a new family of relations between (co)homology classes, working with coeffi...
This paper analyses the topological information of a digital object O under a combined combinatorial...
Homology theory formalizes the concept of hole in a space. For a given subset of the Euclidean space...
A 2D topology-based digital image processing framework is presented here. This framework consists of...
Homological characteristics of digital objects can be obtained in a straightforward manner computing...
In [4], given a binary 26-adjacency voxel-based digital volume V, the homological information (that ...
Given a 3D binary voxel-based digital object V, an algorithm for computing homological information f...
We introduce here a new F2 homology computation algorithm based on a generalization of the spanning ...
The homology of binary 3–dimensional digital images (digital volumes) provides concise algebraic des...
Given an 80-adjacency doxel-based digital four-dimensional hypervolume V, we construct here an assoc...
The paper analyzes the connectivity information (more precisely, numbers of tunnels and their homolo...
We present here a topo–geometrical description of a subdivided nD object called homological spanning...
Segmentations of a digital object based on a connectivity criterion at n-xel or sub-n-xel level are...
Computing and representing topological information form an important part in many applications such...
The goal of this paper is to construct an algebraic-topological representation of a 80–adjacent doxe...
In this paper we design a new family of relations between (co)homology classes, working with coeffi...
This paper analyses the topological information of a digital object O under a combined combinatorial...
Homology theory formalizes the concept of hole in a space. For a given subset of the Euclidean space...
A 2D topology-based digital image processing framework is presented here. This framework consists of...