English

Minimum bounded chains and minimum homologous chains in embedded simplicial complexes

Computational Geometry 2020-03-31 v2 Algebraic Topology

Abstract

We study two optimization problems on simplicial complexes with homology over Z2\mathbb{Z}_2, the minimum bounded chain problem: given a dd-dimensional complex K\mathcal{K} embedded in Rd+1\mathbb{R}^{d+1} and a null-homologous (d1)(d-1)-cycle CC in K\mathcal{K}, find the minimum dd-chain with boundary CC, and the minimum homologous chain problem: given a (d+1)(d+1)-manifold M\mathcal{M} and a dd-chain DD in M\mathcal{M}, find the minimum dd-chain homologous to DD. We show strong hardness results for both problems even for small values of dd; d=2d = 2 for the former problem, and d=1d=1 for the latter problem. We show that both problems are APX-hard, and hard to approximate within any constant factor assuming the unique games conjecture. On the positive side, we show that both problems are fixed parameter tractable with respect to the size of the optimal solution. Moreover, we provide an O(logβd)O(\sqrt{\log \beta_d})-approximation algorithm for the minimum bounded chain problem where βd\beta_d is the ddth Betti number of K\mathcal{K}. Finally, we provide an O(lognd+1)O(\sqrt{\log n_{d+1}})-approximation algorithm for the minimum homologous chain problem where nd+1n_{d+1} is the number of dd-simplices in M\mathcal{M}.

Keywords

Cite

@article{arxiv.2003.02801,
  title  = {Minimum bounded chains and minimum homologous chains in embedded simplicial complexes},
  author = {Glencora Borradaile and William Maxwell and Amir Nayyeri},
  journal= {arXiv preprint arXiv:2003.02801},
  year   = {2020}
}
R2 v1 2026-06-23T14:05:29.902Z