Add to ORKGWe use weights on objects in an abelian category to define what we call a path metric. We introduce three special classes of weight: those compatible with short exact sequences; those induced by their path metric; and those which bound their path metric. We prove that these conditions are in fact equivalent, and call such weights exact. As a special case of a path metric, we obtain a distance for generalized persistence modules whose indexing category is a measure space. We use this distance to define Wasserstein distances, which coincide with the previously defined Wasserstein distances for one-parameter persistence modules. For one-parameter persistence modules, we also describe maps to and from an interval module, and we give a matrix re...
The extended persistence diagram is an invariant of piecewise linear functions, introduced by Cohen-...
The interleaving distance is arguably the most prominent distance measure in topological data analys...
We develop some aspects of the homological algebra of persistence modules, in both the one-parameter...
In persistence theory and practice, measuring distances between modules is central. The Wasserstein ...
We prove that persistence diagrams with the p-Wasserstein distance form the universal p-subadditive ...
The use of persistent homology in applications is justified by the validity of certain stability res...
We define a class of invariants, which we call homological invariants, for persistence modules over ...
We introduce a refinement of the persistence diagram, the graded persistence diagram. It is the Mobi...
We provide a definition of ephemeral multi-persistent modules and prove that the quotient of persist...
Recent years have witnessed a tremendous growth using topological summaries, especially the persiste...
Motivated by persistent homology and topological data analysis, we consider formal sums on a metric ...
In topological data analysis (TDA), persistence diagrams have been a succesful tool. To compare them...
The interleaving distance for persistence modules, originally defined by Chazal et al., is arguably ...
We present the shift-dimension of multipersistence modules and investigate its algebraic properties....
The matching distance is a pseudometric on multi-parameter persistence modules, defined in terms of ...
The extended persistence diagram is an invariant of piecewise linear functions, introduced by Cohen-...
The interleaving distance is arguably the most prominent distance measure in topological data analys...
We develop some aspects of the homological algebra of persistence modules, in both the one-parameter...
In persistence theory and practice, measuring distances between modules is central. The Wasserstein ...
We prove that persistence diagrams with the p-Wasserstein distance form the universal p-subadditive ...
The use of persistent homology in applications is justified by the validity of certain stability res...
We define a class of invariants, which we call homological invariants, for persistence modules over ...
We introduce a refinement of the persistence diagram, the graded persistence diagram. It is the Mobi...
We provide a definition of ephemeral multi-persistent modules and prove that the quotient of persist...
Recent years have witnessed a tremendous growth using topological summaries, especially the persiste...
Motivated by persistent homology and topological data analysis, we consider formal sums on a metric ...
In topological data analysis (TDA), persistence diagrams have been a succesful tool. To compare them...
The interleaving distance for persistence modules, originally defined by Chazal et al., is arguably ...
We present the shift-dimension of multipersistence modules and investigate its algebraic properties....
The matching distance is a pseudometric on multi-parameter persistence modules, defined in terms of ...
The extended persistence diagram is an invariant of piecewise linear functions, introduced by Cohen-...
The interleaving distance is arguably the most prominent distance measure in topological data analys...
We develop some aspects of the homological algebra of persistence modules, in both the one-parameter...