English

Extremal Betti Numbers and Persistence in Flag Complexes

Combinatorics 2025-03-03 v1 Algebraic Topology Optimization and Control

Abstract

We investigate several problems concerning extremal Betti numbers and persistence in filtrations of flag complexes. For graphs on nn vertices, we show that βk(X(G))\beta_k(X(G)) is maximal when G=Tn,k+1G=\mathcal{T}_{n,k+1}, the Tur\'an graph on k+1k+1 partition classes, where X(G)X(G) denotes the flag complex of GG. Building on this, we construct an edgewise (one edge at a time) filtration G=G1Tn,k+1\mathcal{G}=G_1\subseteq \cdots \subseteq \mathcal{T}_{n,k+1} for which βk(X(Gi))\beta_k(X(G_i)) is maximal for all graphs on nn vertices and ii edges. Moreover, the persistence barcode Bk(X(G))\mathcal{B}_k(X(G)) achieves a maximal number of intervals, and total persistence, among all edgewise filtrations with E(Tn,k+1)|E(\mathcal{T}_{n,k+1})| edges. For k=1k=1, we consider edgewise filtrations of the complete graph KnK_n. We show that the maximal number of intervals in the persistence barcode is obtained precisely when Gn/2n/2=Tn,2G_{\lceil n/2\rceil \cdot \lfloor n/2 \rfloor}=\mathcal{T}_{n,2}. Among such filtrations, we characterize those achieving maximal total persistence. We further show that no filtration can optimize β1(X(Gi))\beta_1(X(G_i)) for all ii, and conjecture that our filtrations maximize the total persistence over all edgewise filtrations of KnK_n.

Cite

@article{arxiv.2502.21294,
  title  = {Extremal Betti Numbers and Persistence in Flag Complexes},
  author = {Lies Beers and Magnus Bakke Botnan},
  journal= {arXiv preprint arXiv:2502.21294},
  year   = {2025}
}
R2 v1 2026-06-28T22:02:15.770Z