Embeddability in the 3-sphere is decidable
Geometric Topology
2014-02-06 v2 Computational Geometry
Abstract
We show that the following algorithmic problem is decidable: given a -dimensional simplicial complex, can it be embedded (topologically, or equivalently, piecewise linearly) in ? By a known reduction, it suffices to decide the embeddability of a given triangulated 3-manifold into the 3-sphere . The main step, which allows us to simplify and recurse, is in proving that if can be embedded in , then there is also an embedding in which has a short meridian, i.e., an essential curve in the boundary of bounding a disk in with length bounded by a computable function of the number of tetrahedra of .
Cite
@article{arxiv.1402.0815,
title = {Embeddability in the 3-sphere is decidable},
author = {Jiří Matoušek and Eric Sedgwick and Martin Tancer and Uli Wagner},
journal= {arXiv preprint arXiv:1402.0815},
year = {2014}
}
Comments
54 pages, 26 figures; few faulty references to figures in the first version fixed