English

The complexity of pinning simple multiloops

Geometric Topology 2026-02-10 v1 Combinatorics

Abstract

A multiloop with sNs\in \mathbb{N} strands is a generic immersion γ ⁣:1sS1Σ\gamma\colon \sqcup_1^s \mathbb{S}^1 \looparrowright \Sigma of the union of ss circles into a surface Σ\Sigma, considered up to homeomorphisms. A pinning set of γ\gamma is a set of points PΣim(γ)P\subset \Sigma\setminus \operatorname{im}(\gamma), such that in the punctured surface ΣP\Sigma \setminus P, the immersion γ\gamma has the minimal number of double points in its homotopy class. Its pinning number ϖ(γ)\varpi(\gamma) is the minimum cardinal of its pinning sets. In any fixed orientable surface Σ\Sigma, the pinning problem which given a multiloop γ\gamma and kNk\in \mathbb{N} decides whether ϖ(γ)k\varpi(\gamma)\le k has been show to be NP-complete, even in restrictions to loops (with s=1s=1 strand). In this work we study the complexity of the pinning problem in restriction to multiloops whose strands are simple (embedded circles). We show that in any fixed oriented surface Σ\Sigma, the problem is in P when s3s\leq 3 and NP-complete when s20s\geq 20, and present some follow-up questions and conjectures.

Cite

@article{arxiv.2602.07344,
  title  = {The complexity of pinning simple multiloops},
  author = {Eric Seo and Christopher-Lloyd Simon and Ben Stucky},
  journal= {arXiv preprint arXiv:2602.07344},
  year   = {2026}
}

Comments

33 pages, 22 figures

R2 v1 2026-07-01T10:25:39.220Z