Meta-Diagrams for 2-Parameter Persistence
Abstract
We first introduce the notion of meta-rank for a 2-parameter persistence module, an invariant that captures the information behind images of morphisms between 1D slices of the module. We then define the meta-diagram of a 2-parameter persistence module to be the M\"{o}bius inversion of the meta-rank, resulting in a function that takes values from signed 1-parameter persistence modules. We show that the meta-rank and meta-diagram contain information equivalent to the rank invariant and the signed barcode. This equivalence leads to computational benefits, as we introduce an algorithm for computing the meta-rank and meta-diagram of a 2-parameter module indexed by a bifiltration of simplices in time. This implies an improvement upon the existing algorithm for computing the signed barcode, which has runtime. This also allows us to improve the existing upper bound on the number of rectangles in the rank decomposition of from to . In addition, we define notions of erosion distance between meta-ranks and between meta-diagrams, and show that under these distances, meta-ranks and meta-diagrams are stable with respect to the interleaving distance. Lastly, the meta-diagram can be visualized in an intuitive fashion as a persistence diagram of diagrams, which generalizes the well-understood persistence diagram in the 1-parameter setting.
Cite
@article{arxiv.2303.08270,
title = {Meta-Diagrams for 2-Parameter Persistence},
author = {Nate Clause and Tamal K. Dey and Facundo Mémoli and Bei Wang},
journal= {arXiv preprint arXiv:2303.08270},
year = {2023}
}
Comments
22 pages, 8 figures. Full version of the paper that is to appear in the Proceedings of the 39th International Symposium on Computational Geometry (SoCG 2023)