English

Computing the interleaving distance is NP-hard

Computational Geometry 2019-10-10 v2 Algebraic Topology

Abstract

We show that computing the interleaving distance between two multi-graded persistence modules is NP-hard. More precisely, we show that deciding whether two modules are 11-interleaved is NP-complete, already for bigraded, interval decomposable modules. Our proof is based on previous work showing that a constrained matrix invertibility problem can be reduced to the interleaving distance computation of a special type of persistence modules. We show that this matrix invertibility problem is NP-complete. We also give a slight improvement of the above reduction, showing that also the approximation of the interleaving distance is NP-hard for any approximation factor smaller than 33. Additionally, we obtain corresponding hardness results for the case that the modules are indecomposable, and in the setting of one-sided stability. Furthermore, we show that checking for injections (resp. surjections) between persistence modules is NP-hard. In conjunction with earlier results from computational algebra this gives a complete characterization of the computational complexity of one-sided stability. Lastly, we show that it is in general NP-hard to approximate distances induced by noise systems within a factor of 2.

Keywords

Cite

@article{arxiv.1811.09165,
  title  = {Computing the interleaving distance is NP-hard},
  author = {Håvard Bakke Bjerkevik and Magnus Bakke Botnan and Michael Kerber},
  journal= {arXiv preprint arXiv:1811.09165},
  year   = {2019}
}

Comments

25 pages. Several expository improvements and minor corrections. Also added a section on noise systems

R2 v1 2026-06-23T05:24:34.351Z