Persistence Diagrams as Diagrams: A Categorification of the Stability Theorem
read the original abstract
Persistent homology, a central tool of topological data analysis, provides invariants of data called barcodes (also known as persistence diagrams). A barcode is simply a multiset of real intervals. Recent work of Edelsbrunner, Jablonski, and Mrozek suggests an equivalent description of barcodes as functors R -> Mch, where R is the poset category of real numbers and Mch is the category whose objects are sets and whose morphisms are matchings (i.e., partial injective functions). Such functors form a category Mch^R whose morphisms are the natural transformations. Thus, this interpretation of barcodes gives us a hitherto unstudied categorical structure on barcodes. The aim of this note is to show that this categorical structure leads to surprisingly simple reformulations of both the well-known stability theorem for persistent homology and a recent generalization called the induced matching theorem.
This paper has not been read by Pith yet.
Forward citations
Cited by 1 Pith paper
-
A Topological Formula for Potts Lattice Gauge Theory Correlations
A formula is derived relating Wilson loop correlations in Potts lattice gauge theory to a topological quantity in the plaquette random cluster model, enabling proofs about correlation lengths on Z^d at various tempera...
discussion (0)
Sign in with ORCID, Apple, or X to comment. Anyone can read and Pith papers without signing in.