The present lack of a stable method to compare persistent homology groups with torsion is a relevant problem in current research about Persistent Homology and its applications in Pattern Recognition. In this paper we introduce a pseudo-distance d_T that represents a possible solution to this problem. Indeed, d_T is a pseudo-distance between multidimensional persistent homology groups with coefficients in an Abelian group, hence possibly having torsion. Our main theorem proves the stability of the new pseudo-distance with respect to the change of the filtering function, expressed both with respect to the max-norm and to the natural pseudo-distance between topological spaces endowed with vector-valued filtering functions. Furthermore, we prov...
The natural pseudo-distance dG associated with a group G of self-homeomorphisms of a topological spa...
A recent result on size functions is extended to higher homology modules: the persistent homology b...
In the context of 2D persistent homology a new metric has been recently introduced, the coherent mat...
The present lack of a stable method to compare persistent homology groups with torsion is a relevant...
Classical persistent homology is not tailored to study the action of transformation groups different...
Persistent Topology studies topological features of shapes by analyzing the lower level sets of sui...
We introduce the persistent homotopy type distance d_HT to compare two real valued functions defined...
Multidimensional persistence studies topological features of shapes by analyzing the lower level set...
The theory of multidimensional persistent homology was initially developed in the discrete setting, ...
none1noClassical persistent homology is a powerful mathematical tool for shape comparison. Unfortuna...
Comparison between multidimensional persistent Betti numbers is often based on the multidimensional ...
In this paper we study a new metric for comparing Betti numbers functions in bidimensional persisten...
Persistent homology has proven itself quite efficient in the topological and qualitative comparison ...
Homology gives a tool to measure the "holes" in topological spaces. Persistent homology extends the ...
Multidimensional persistence mostly studies topological features of shapes by analyzing the lower le...
The natural pseudo-distance dG associated with a group G of self-homeomorphisms of a topological spa...
A recent result on size functions is extended to higher homology modules: the persistent homology b...
In the context of 2D persistent homology a new metric has been recently introduced, the coherent mat...
The present lack of a stable method to compare persistent homology groups with torsion is a relevant...
Classical persistent homology is not tailored to study the action of transformation groups different...
Persistent Topology studies topological features of shapes by analyzing the lower level sets of sui...
We introduce the persistent homotopy type distance d_HT to compare two real valued functions defined...
Multidimensional persistence studies topological features of shapes by analyzing the lower level set...
The theory of multidimensional persistent homology was initially developed in the discrete setting, ...
none1noClassical persistent homology is a powerful mathematical tool for shape comparison. Unfortuna...
Comparison between multidimensional persistent Betti numbers is often based on the multidimensional ...
In this paper we study a new metric for comparing Betti numbers functions in bidimensional persisten...
Persistent homology has proven itself quite efficient in the topological and qualitative comparison ...
Homology gives a tool to measure the "holes" in topological spaces. Persistent homology extends the ...
Multidimensional persistence mostly studies topological features of shapes by analyzing the lower le...
The natural pseudo-distance dG associated with a group G of self-homeomorphisms of a topological spa...
A recent result on size functions is extended to higher homology modules: the persistent homology b...
In the context of 2D persistent homology a new metric has been recently introduced, the coherent mat...