Given an 80-adjacency doxel-based digital four-dimensional hypervolume V, we construct here an associated oriented 4–dimensional polytopal cell complex K(V), having the same integer homological information (that related to n-dimensional holes that object has) than V. This is the first step toward the construction of an algebraic-topological representation (AT-model) for V, which suitably codifies it mainly in terms of its homological information. This AT-model is especially suitable for global and local topological analysis of digital 4D images
In [14], a topologically consistent framework to support parallel topological analysis and recogniti...
In this paper, algorithms for computing integer (co)homology of a simplicial complex of any dimensio...
AbstractThis paper presents a set of tools to compute topological information of simplicial complexe...
The goal of this paper is to construct an algebraic-topological representation of a 80–adjacent doxe...
In [4], given a binary 26-adjacency voxel-based digital volume V, the homological information (that ...
In this paper, we determine a cell complex representation of a 80–adjacent doxelbased 4-dimensional ...
Given a 3D binary voxel-based digital object V, an algorithm for computing homological information f...
In this paper, we provide a graph-based representation of the homology (information related to the d...
The homology of binary 3–dimensional digital images (digital volumes) provides concise algebraic des...
Starting from an nD geometrical object, a cellular subdivision of such an object provides an algebra...
Homological characteristics of digital objects can be obtained in a straightforward manner computing...
When the ground ring is a field, the notion of algebraic topological model (AT-model) is a useful to...
In this paper we design a new family of relations between (co)homology classes, working with coeffi...
This paper presents a set of tools to compute topological information of simplicial complexes, tools...
We present here a topo–geometrical description of a subdivided nD object called homological spanning...
In [14], a topologically consistent framework to support parallel topological analysis and recogniti...
In this paper, algorithms for computing integer (co)homology of a simplicial complex of any dimensio...
AbstractThis paper presents a set of tools to compute topological information of simplicial complexe...
The goal of this paper is to construct an algebraic-topological representation of a 80–adjacent doxe...
In [4], given a binary 26-adjacency voxel-based digital volume V, the homological information (that ...
In this paper, we determine a cell complex representation of a 80–adjacent doxelbased 4-dimensional ...
Given a 3D binary voxel-based digital object V, an algorithm for computing homological information f...
In this paper, we provide a graph-based representation of the homology (information related to the d...
The homology of binary 3–dimensional digital images (digital volumes) provides concise algebraic des...
Starting from an nD geometrical object, a cellular subdivision of such an object provides an algebra...
Homological characteristics of digital objects can be obtained in a straightforward manner computing...
When the ground ring is a field, the notion of algebraic topological model (AT-model) is a useful to...
In this paper we design a new family of relations between (co)homology classes, working with coeffi...
This paper presents a set of tools to compute topological information of simplicial complexes, tools...
We present here a topo–geometrical description of a subdivided nD object called homological spanning...
In [14], a topologically consistent framework to support parallel topological analysis and recogniti...
In this paper, algorithms for computing integer (co)homology of a simplicial complex of any dimensio...
AbstractThis paper presents a set of tools to compute topological information of simplicial complexe...