English

Flagifying the Dowker Complex

Algebraic Topology 2025-08-20 v2 Computational Geometry

Abstract

The Dowker complex DR(X,Y)\mathrm{D}_{R}(X,Y) is a simplicial complex capturing the topological interplay between two finite sets XX and YY under some relation RX×YR\subseteq X\times Y. While its definition is asymmetric, the famous Dowker duality states that DR(X,Y)\mathrm{D}_{R}(X,Y) and DR(Y,X)\mathrm{D}_{R}(Y,X) have homotopy equivalent geometric realizations. We introduce the Dowker-Rips complex DRR(X,Y)\mathrm{DR}_{R}(X,Y), defined as the flagification of the Dowker complex or, equivalently, as the maximal simplicial complex whose 11-skeleton coincides with that of DR(X,Y)\mathrm{D}_{R}(X,Y). This is motivated by applications in topological data analysis, since as a flag complex, the Dowker-Rips complex is less expensive to compute than the Dowker complex. While the Dowker duality does not hold for Dowker-Rips complexes in general, we show that one still has that Hi(DRR(X,Y))Hi(DRR(Y,X))\mathrm{H}_{i}(\mathrm{DR}_{R}(X,Y))\cong\mathrm{H}_{i}(\mathrm{DR}_{R}(Y,X)) for i=0,1i=0,1. We further show that this weakened duality extends to the setting of persistent homology, and quantify the ``failure" of the Dowker duality in homological dimensions higher than 11 by means of interleavings. This makes the Dowker-Rips complex a less expensive, approximate version of the Dowker complex that is usable in topological data analysis. Indeed, we provide a Python implementation of the Dowker-Rips complex and, as an application, we show that it can be used as a drop-in replacement for the Dowker complex in a tumor microenvironment classification pipeline. In that pipeline, using the Dowker-Rips complex leads to increase in speed while retaining classification performance.

Cite

@article{arxiv.2508.08025,
  title  = {Flagifying the Dowker Complex},
  author = {Marius Huber and Patrick Schnider},
  journal= {arXiv preprint arXiv:2508.08025},
  year   = {2025}
}

Comments

14 pages, comments welcome; fixed typos

R2 v1 2026-07-01T04:44:26.172Z