English

Taut fillings

Geometric Topology 2026-03-24 v2 Combinatorics

Abstract

Sleator, Tarjan, and Thurston asked: Given a triangulation σ\sigma of the 2-sphere, what is the minimum number of tetrahedra needed to extend σ\sigma to a triangulation of the ball? Call this minimum tetvol(σ)\mathrm{tetvol}(\sigma). Let XX be the integral 2-cycle associated to an orientation of σ\sigma, and let Zvol(σ)\mathrm{Zvol}(\sigma) be the minimum L1L_1-norm of an integral 3-chain MM with M=X\partial M = X. We show that Zvol(σ)=tetvol(σ)\mathrm{Zvol}(\sigma) = \mathrm{tetvol}(\sigma), and any optimal MM arises from an extension of σ\sigma to a simplicial complex homeomorphic to the 3-ball. This complex is shellable, and `flag': Every clique in its 1-skeleton occurs as a simplex. The key to the proof is the general fact that any optimal filling of an integral nn-cycle splits under disjoint union, connected sum, and more generally what we call almost disjoint union, where summands are supported on sets that overlap in at most n+1n+1 vertices.

Cite

@article{arxiv.2505.09736,
  title  = {Taut fillings},
  author = {Peter Doyle and Matthew Ellison and Zili Wang},
  journal= {arXiv preprint arXiv:2505.09736},
  year   = {2026}
}

Comments

This new version has improved exposition, and adds the flag complex result

R2 v1 2026-06-28T23:33:37.348Z