Persistence modules have a natural home in the setting of stratified spaces and constructible cosheaves. In this article, we first give explicit constructible cosheaves for common data-motivated persistence modules, namely, for modules that arise from zig‑zag filtrations (including monotone filtrations), and for augmented persistence modules (which encode the data of instantaneous events). We then identify an equivalence of categories between a particular notion of zig‑zag modules and the combinatorial entrance path category on stratified R. Finally, we compute the algebraic K-theory of generalized zig‑zag modules and describe connections to both Euler curves and K_0 of the monoid of persistence diagrams as described by Bubenik and Elchesen
We develop some aspects of the homological algebra of persistence modules, in both the one-parameter...
We provide a definition of ephemeral multi-persistent modules and prove that the quotient of persist...
In this paper, we study multidimensional persistence modules (Carlsson and Zomorodian in Discrete Co...
Persistence modules have a natural home in the setting of stratified spaces and constructible coshea...
I will interpret the persistence diagram of Cohen-Steiner, Edelsbrunner, and Harer as the Möbius inv...
Abstract. Topological persistence is, by now, an established paradigm for constructing robust topo-l...
We study the problem of computing zigzag persistence of a sequence of homology groups and study a pa...
International audienceWe introduce a theoretical and computational framework to use discrete Morse t...
We study persistence modules defined on commutative ladders. This class of persis-tence modules freq...
In a context where huge amounts of data are available, extracting meaningful and non trivial informa...
Chazal F, Crawley-Boevey WW, de Silva V. THE OBSERVABLE STRUCTURE OF PERSISTENCE MODULES. HOMOLOGY H...
We give a self-contained treatment of the theory of persistence modules indexed over the real line. ...
Abstract. The theory of zigzag persistence is a substantial extension of persistent homology, and it...
In persistent topology, q-tame modules appear as a natural and large class of persistence modules in...
This paper introduces parametrized homology, a continuous-parameter generalization of levelset zigza...
We develop some aspects of the homological algebra of persistence modules, in both the one-parameter...
We provide a definition of ephemeral multi-persistent modules and prove that the quotient of persist...
In this paper, we study multidimensional persistence modules (Carlsson and Zomorodian in Discrete Co...
Persistence modules have a natural home in the setting of stratified spaces and constructible coshea...
I will interpret the persistence diagram of Cohen-Steiner, Edelsbrunner, and Harer as the Möbius inv...
Abstract. Topological persistence is, by now, an established paradigm for constructing robust topo-l...
We study the problem of computing zigzag persistence of a sequence of homology groups and study a pa...
International audienceWe introduce a theoretical and computational framework to use discrete Morse t...
We study persistence modules defined on commutative ladders. This class of persis-tence modules freq...
In a context where huge amounts of data are available, extracting meaningful and non trivial informa...
Chazal F, Crawley-Boevey WW, de Silva V. THE OBSERVABLE STRUCTURE OF PERSISTENCE MODULES. HOMOLOGY H...
We give a self-contained treatment of the theory of persistence modules indexed over the real line. ...
Abstract. The theory of zigzag persistence is a substantial extension of persistent homology, and it...
In persistent topology, q-tame modules appear as a natural and large class of persistence modules in...
This paper introduces parametrized homology, a continuous-parameter generalization of levelset zigza...
We develop some aspects of the homological algebra of persistence modules, in both the one-parameter...
We provide a definition of ephemeral multi-persistent modules and prove that the quotient of persist...
In this paper, we study multidimensional persistence modules (Carlsson and Zomorodian in Discrete Co...